author | nipkow |
Fri, 10 Apr 2015 12:16:58 +0200 | |
changeset 59999 | 3fa68bacfa2b |
parent 59997 | 90fb391a15c1 |
parent 59998 | c54d36be22ef |
child 60397 | f8a513fedb31 |
permissions | -rw-r--r-- |
10249 | 1 |
(* Title: HOL/Library/Multiset.thy |
15072 | 2 |
Author: Tobias Nipkow, Markus Wenzel, Lawrence C Paulson, Norbert Voelker |
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killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
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changeset
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3 |
Author: Andrei Popescu, TU Muenchen |
59813 | 4 |
Author: Jasmin Blanchette, Inria, LORIA, MPII |
5 |
Author: Dmitriy Traytel, TU Muenchen |
|
6 |
Author: Mathias Fleury, MPII |
|
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*) |
8 |
||
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section {* (Finite) multisets *} |
10249 | 10 |
|
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theory Multiset |
51599
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haftmann
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12 |
imports Main |
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begin |
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|
15 |
subsection {* The type of multisets *} |
|
16 |
||
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|
17 |
definition "multiset = {f :: 'a => nat. finite {x. f x > 0}}" |
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18 |
|
49834 | 19 |
typedef 'a multiset = "multiset :: ('a => nat) set" |
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parents:
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20 |
morphisms count Abs_multiset |
45694
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parents:
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diff
changeset
|
21 |
unfolding multiset_def |
10249 | 22 |
proof |
45694
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prefer typedef without extra definition and alternative name;
wenzelm
parents:
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diff
changeset
|
23 |
show "(\<lambda>x. 0::nat) \<in> {f. finite {x. f x > 0}}" by simp |
10249 | 24 |
qed |
25 |
||
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multiset operations are defined with lift_definitions;
bulwahn
parents:
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diff
changeset
|
26 |
setup_lifting type_definition_multiset |
19086 | 27 |
|
28708
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haftmann
parents:
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diff
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28 |
abbreviation Melem :: "'a => 'a multiset => bool" ("(_/ :# _)" [50, 51] 50) where |
25610 | 29 |
"a :# M == 0 < count M a" |
30 |
||
26145 | 31 |
notation (xsymbols) |
32 |
Melem (infix "\<in>#" 50) |
|
10249 | 33 |
|
39302
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renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
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diff
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|
34 |
lemma multiset_eq_iff: |
34943
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haftmann
parents:
33102
diff
changeset
|
35 |
"M = N \<longleftrightarrow> (\<forall>a. count M a = count N a)" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
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parents:
39301
diff
changeset
|
36 |
by (simp only: count_inject [symmetric] fun_eq_iff) |
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haftmann
parents:
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changeset
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37 |
|
39302
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parents:
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diff
changeset
|
38 |
lemma multiset_eqI: |
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haftmann
parents:
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diff
changeset
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39 |
"(\<And>x. count A x = count B x) \<Longrightarrow> A = B" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
40 |
using multiset_eq_iff by auto |
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haftmann
parents:
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diff
changeset
|
41 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
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42 |
text {* |
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haftmann
parents:
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43 |
\medskip Preservation of the representing set @{term multiset}. |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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44 |
*} |
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haftmann
parents:
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diff
changeset
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45 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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changeset
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46 |
lemma const0_in_multiset: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
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47 |
"(\<lambda>a. 0) \<in> multiset" |
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
48 |
by (simp add: multiset_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
49 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
50 |
lemma only1_in_multiset: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
51 |
"(\<lambda>b. if b = a then n else 0) \<in> multiset" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
52 |
by (simp add: multiset_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
53 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
54 |
lemma union_preserves_multiset: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
55 |
"M \<in> multiset \<Longrightarrow> N \<in> multiset \<Longrightarrow> (\<lambda>a. M a + N a) \<in> multiset" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
56 |
by (simp add: multiset_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
57 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
58 |
lemma diff_preserves_multiset: |
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haftmann
parents:
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diff
changeset
|
59 |
assumes "M \<in> multiset" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
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60 |
shows "(\<lambda>a. M a - N a) \<in> multiset" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
61 |
proof - |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
62 |
have "{x. N x < M x} \<subseteq> {x. 0 < M x}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
63 |
by auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
64 |
with assms show ?thesis |
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
65 |
by (auto simp add: multiset_def intro: finite_subset) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
66 |
qed |
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
67 |
|
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
68 |
lemma filter_preserves_multiset: |
34943
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
69 |
assumes "M \<in> multiset" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
70 |
shows "(\<lambda>x. if P x then M x else 0) \<in> multiset" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
71 |
proof - |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
72 |
have "{x. (P x \<longrightarrow> 0 < M x) \<and> P x} \<subseteq> {x. 0 < M x}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
73 |
by auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
74 |
with assms show ?thesis |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
75 |
by (auto simp add: multiset_def intro: finite_subset) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
76 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
77 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
78 |
lemmas in_multiset = const0_in_multiset only1_in_multiset |
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
79 |
union_preserves_multiset diff_preserves_multiset filter_preserves_multiset |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
80 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
81 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
82 |
subsection {* Representing multisets *} |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
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83 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
84 |
text {* Multiset enumeration *} |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
85 |
|
48008 | 86 |
instantiation multiset :: (type) cancel_comm_monoid_add |
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
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diff
changeset
|
87 |
begin |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25507
diff
changeset
|
88 |
|
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
89 |
lift_definition zero_multiset :: "'a multiset" is "\<lambda>a. 0" |
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
90 |
by (rule const0_in_multiset) |
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25507
diff
changeset
|
91 |
|
34943
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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diff
changeset
|
92 |
abbreviation Mempty :: "'a multiset" ("{#}") where |
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
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parents:
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diff
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|
93 |
"Mempty \<equiv> 0" |
25571
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instantiation target rather than legacy instance
haftmann
parents:
25507
diff
changeset
|
94 |
|
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
95 |
lift_definition plus_multiset :: "'a multiset => 'a multiset => 'a multiset" is "\<lambda>M N. (\<lambda>a. M a + N a)" |
ec64d94cbf9c
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bulwahn
parents:
47308
diff
changeset
|
96 |
by (rule union_preserves_multiset) |
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25507
diff
changeset
|
97 |
|
59815
cce82e360c2f
explicit commutative additive inverse operation;
haftmann
parents:
59813
diff
changeset
|
98 |
lift_definition minus_multiset :: "'a multiset => 'a multiset => 'a multiset" is "\<lambda> M N. \<lambda>a. M a - N a" |
cce82e360c2f
explicit commutative additive inverse operation;
haftmann
parents:
59813
diff
changeset
|
99 |
by (rule diff_preserves_multiset) |
cce82e360c2f
explicit commutative additive inverse operation;
haftmann
parents:
59813
diff
changeset
|
100 |
|
48008 | 101 |
instance |
59815
cce82e360c2f
explicit commutative additive inverse operation;
haftmann
parents:
59813
diff
changeset
|
102 |
by default (transfer, simp add: fun_eq_iff)+ |
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25507
diff
changeset
|
103 |
|
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
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diff
changeset
|
104 |
end |
10249 | 105 |
|
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
106 |
lift_definition single :: "'a => 'a multiset" is "\<lambda>a b. if b = a then 1 else 0" |
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
107 |
by (rule only1_in_multiset) |
15869 | 108 |
|
26145 | 109 |
syntax |
26176 | 110 |
"_multiset" :: "args => 'a multiset" ("{#(_)#}") |
25507 | 111 |
translations |
112 |
"{#x, xs#}" == "{#x#} + {#xs#}" |
|
113 |
"{#x#}" == "CONST single x" |
|
114 |
||
34943
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
115 |
lemma count_empty [simp]: "count {#} a = 0" |
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
116 |
by (simp add: zero_multiset.rep_eq) |
10249 | 117 |
|
34943
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haftmann
parents:
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diff
changeset
|
118 |
lemma count_single [simp]: "count {#b#} a = (if b = a then 1 else 0)" |
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
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diff
changeset
|
119 |
by (simp add: single.rep_eq) |
29901 | 120 |
|
10249 | 121 |
|
34943
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
122 |
subsection {* Basic operations *} |
10249 | 123 |
|
124 |
subsubsection {* Union *} |
|
125 |
||
34943
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parents:
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|
126 |
lemma count_union [simp]: "count (M + N) a = count M a + count N a" |
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
127 |
by (simp add: plus_multiset.rep_eq) |
10249 | 128 |
|
129 |
||
130 |
subsubsection {* Difference *} |
|
131 |
||
49388 | 132 |
instantiation multiset :: (type) comm_monoid_diff |
34943
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haftmann
parents:
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|
133 |
begin |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
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changeset
|
134 |
|
49388 | 135 |
instance |
136 |
by default (transfer, simp add: fun_eq_iff)+ |
|
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137 |
|
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138 |
end |
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139 |
|
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140 |
lemma count_diff [simp]: "count (M - N) a = count M a - count N a" |
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141 |
by (simp add: minus_multiset.rep_eq) |
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142 |
|
17161 | 143 |
lemma diff_empty [simp]: "M - {#} = M \<and> {#} - M = {#}" |
52289 | 144 |
by rule (fact Groups.diff_zero, fact Groups.zero_diff) |
36903 | 145 |
|
146 |
lemma diff_cancel[simp]: "A - A = {#}" |
|
52289 | 147 |
by (fact Groups.diff_cancel) |
10249 | 148 |
|
36903 | 149 |
lemma diff_union_cancelR [simp]: "M + N - N = (M::'a multiset)" |
52289 | 150 |
by (fact add_diff_cancel_right') |
10249 | 151 |
|
36903 | 152 |
lemma diff_union_cancelL [simp]: "N + M - N = (M::'a multiset)" |
52289 | 153 |
by (fact add_diff_cancel_left') |
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154 |
|
52289 | 155 |
lemma diff_right_commute: |
156 |
"(M::'a multiset) - N - Q = M - Q - N" |
|
157 |
by (fact diff_right_commute) |
|
158 |
||
159 |
lemma diff_add: |
|
160 |
"(M::'a multiset) - (N + Q) = M - N - Q" |
|
161 |
by (rule sym) (fact diff_diff_add) |
|
58425 | 162 |
|
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163 |
lemma insert_DiffM: |
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164 |
"x \<in># M \<Longrightarrow> {#x#} + (M - {#x#}) = M" |
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165 |
by (clarsimp simp: multiset_eq_iff) |
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166 |
|
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167 |
lemma insert_DiffM2 [simp]: |
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168 |
"x \<in># M \<Longrightarrow> M - {#x#} + {#x#} = M" |
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169 |
by (clarsimp simp: multiset_eq_iff) |
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170 |
|
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171 |
lemma diff_union_swap: |
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172 |
"a \<noteq> b \<Longrightarrow> M - {#a#} + {#b#} = M + {#b#} - {#a#}" |
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173 |
by (auto simp add: multiset_eq_iff) |
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174 |
|
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175 |
lemma diff_union_single_conv: |
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176 |
"a \<in># J \<Longrightarrow> I + J - {#a#} = I + (J - {#a#})" |
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177 |
by (simp add: multiset_eq_iff) |
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178 |
|
10249 | 179 |
|
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180 |
subsubsection {* Equality of multisets *} |
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181 |
|
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182 |
lemma single_not_empty [simp]: "{#a#} \<noteq> {#} \<and> {#} \<noteq> {#a#}" |
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183 |
by (simp add: multiset_eq_iff) |
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184 |
|
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185 |
lemma single_eq_single [simp]: "{#a#} = {#b#} \<longleftrightarrow> a = b" |
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186 |
by (auto simp add: multiset_eq_iff) |
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187 |
|
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188 |
lemma union_eq_empty [iff]: "M + N = {#} \<longleftrightarrow> M = {#} \<and> N = {#}" |
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189 |
by (auto simp add: multiset_eq_iff) |
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190 |
|
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191 |
lemma empty_eq_union [iff]: "{#} = M + N \<longleftrightarrow> M = {#} \<and> N = {#}" |
39302
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|
192 |
by (auto simp add: multiset_eq_iff) |
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193 |
|
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194 |
lemma multi_self_add_other_not_self [simp]: "M = M + {#x#} \<longleftrightarrow> False" |
39302
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|
195 |
by (auto simp add: multiset_eq_iff) |
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196 |
|
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197 |
lemma diff_single_trivial: |
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198 |
"\<not> x \<in># M \<Longrightarrow> M - {#x#} = M" |
39302
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|
199 |
by (auto simp add: multiset_eq_iff) |
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200 |
|
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|
201 |
lemma diff_single_eq_union: |
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202 |
"x \<in># M \<Longrightarrow> M - {#x#} = N \<longleftrightarrow> M = N + {#x#}" |
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|
203 |
by auto |
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204 |
|
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205 |
lemma union_single_eq_diff: |
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206 |
"M + {#x#} = N \<Longrightarrow> M = N - {#x#}" |
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|
207 |
by (auto dest: sym) |
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208 |
|
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209 |
lemma union_single_eq_member: |
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|
210 |
"M + {#x#} = N \<Longrightarrow> x \<in># N" |
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|
211 |
by auto |
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212 |
|
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|
213 |
lemma union_is_single: |
46730 | 214 |
"M + N = {#a#} \<longleftrightarrow> M = {#a#} \<and> N={#} \<or> M = {#} \<and> N = {#a#}" (is "?lhs = ?rhs") |
215 |
proof |
|
34943
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216 |
assume ?rhs then show ?lhs by auto |
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217 |
next |
46730 | 218 |
assume ?lhs then show ?rhs |
219 |
by (simp add: multiset_eq_iff split:if_splits) (metis add_is_1) |
|
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|
220 |
qed |
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|
221 |
|
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222 |
lemma single_is_union: |
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223 |
"{#a#} = M + N \<longleftrightarrow> {#a#} = M \<and> N = {#} \<or> M = {#} \<and> {#a#} = N" |
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|
224 |
by (auto simp add: eq_commute [of "{#a#}" "M + N"] union_is_single) |
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225 |
|
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226 |
lemma add_eq_conv_diff: |
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227 |
"M + {#a#} = N + {#b#} \<longleftrightarrow> M = N \<and> a = b \<or> M = N - {#a#} + {#b#} \<and> N = M - {#b#} + {#a#}" (is "?lhs = ?rhs") |
44890
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|
228 |
(* shorter: by (simp add: multiset_eq_iff) fastforce *) |
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229 |
proof |
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|
230 |
assume ?rhs then show ?lhs |
57512
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|
231 |
by (auto simp add: add.assoc add.commute [of "{#b#}"]) |
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232 |
(drule sym, simp add: add.assoc [symmetric]) |
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233 |
next |
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|
234 |
assume ?lhs |
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235 |
show ?rhs |
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236 |
proof (cases "a = b") |
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237 |
case True with `?lhs` show ?thesis by simp |
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238 |
next |
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239 |
case False |
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240 |
from `?lhs` have "a \<in># N + {#b#}" by (rule union_single_eq_member) |
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241 |
with False have "a \<in># N" by auto |
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242 |
moreover from `?lhs` have "M = N + {#b#} - {#a#}" by (rule union_single_eq_diff) |
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243 |
moreover note False |
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cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
244 |
ultimately show ?thesis by (auto simp add: diff_right_commute [of _ "{#a#}"] diff_union_swap) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
245 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
246 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
247 |
|
58425 | 248 |
lemma insert_noteq_member: |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
249 |
assumes BC: "B + {#b#} = C + {#c#}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
250 |
and bnotc: "b \<noteq> c" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
251 |
shows "c \<in># B" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
252 |
proof - |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
253 |
have "c \<in># C + {#c#}" by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
254 |
have nc: "\<not> c \<in># {#b#}" using bnotc by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
255 |
then have "c \<in># B + {#b#}" using BC by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
256 |
then show "c \<in># B" using nc by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
257 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
258 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
259 |
lemma add_eq_conv_ex: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
260 |
"(M + {#a#} = N + {#b#}) = |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
261 |
(M = N \<and> a = b \<or> (\<exists>K. M = K + {#b#} \<and> N = K + {#a#}))" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
262 |
by (auto simp add: add_eq_conv_diff) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
263 |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
264 |
lemma multi_member_split: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
265 |
"x \<in># M \<Longrightarrow> \<exists>A. M = A + {#x#}" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
266 |
by (rule_tac x = "M - {#x#}" in exI, simp) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
267 |
|
58425 | 268 |
lemma multiset_add_sub_el_shuffle: |
269 |
assumes "c \<in># B" and "b \<noteq> c" |
|
58098 | 270 |
shows "B - {#c#} + {#b#} = B + {#b#} - {#c#}" |
271 |
proof - |
|
58425 | 272 |
from `c \<in># B` obtain A where B: "B = A + {#c#}" |
58098 | 273 |
by (blast dest: multi_member_split) |
274 |
have "A + {#b#} = A + {#b#} + {#c#} - {#c#}" by simp |
|
58425 | 275 |
then have "A + {#b#} = A + {#c#} + {#b#} - {#c#}" |
58098 | 276 |
by (simp add: ac_simps) |
277 |
then show ?thesis using B by simp |
|
278 |
qed |
|
279 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
280 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
281 |
subsubsection {* Pointwise ordering induced by count *} |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
282 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
283 |
instantiation multiset :: (type) ordered_ab_semigroup_add_imp_le |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
284 |
begin |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
285 |
|
55565
f663fc1e653b
simplify proofs because of the stronger reflexivity prover
kuncar
parents:
55467
diff
changeset
|
286 |
lift_definition less_eq_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" is "\<lambda> A B. (\<forall>a. A a \<le> B a)" . |
f663fc1e653b
simplify proofs because of the stronger reflexivity prover
kuncar
parents:
55467
diff
changeset
|
287 |
|
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
288 |
lemmas mset_le_def = less_eq_multiset_def |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
289 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
290 |
definition less_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" where |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
291 |
mset_less_def: "(A::'a multiset) < B \<longleftrightarrow> A \<le> B \<and> A \<noteq> B" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
292 |
|
46921 | 293 |
instance |
294 |
by default (auto simp add: mset_le_def mset_less_def multiset_eq_iff intro: order_trans antisym) |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
295 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
296 |
end |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
297 |
|
59986
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
298 |
abbreviation less_mset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "<#" 50) where |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
299 |
"A <# B \<equiv> A < B" |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
300 |
abbreviation (xsymbols) subset_mset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "\<subset>#" 50) where |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
301 |
"A \<subset># B \<equiv> A < B" |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
302 |
|
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
303 |
abbreviation less_eq_mset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "<=#" 50) where |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
304 |
"A <=# B \<equiv> A \<le> B" |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
305 |
abbreviation (xsymbols) leq_mset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "\<le>#" 50) where |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
306 |
"A \<le># B \<equiv> A \<le> B" |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
307 |
abbreviation (xsymbols) subseteq_mset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "\<subseteq>#" 50) where |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
308 |
"A \<subseteq># B \<equiv> A \<le> B" |
f38b94549dc8
introduced new abbreviations for multiset operations (in the hope of getting rid of the old names <, <=, etc.)
blanchet
parents:
59958
diff
changeset
|
309 |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
310 |
lemma mset_less_eqI: |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
311 |
"(\<And>x. count A x \<le> count B x) \<Longrightarrow> A \<le> B" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
312 |
by (simp add: mset_le_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
313 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
314 |
lemma mset_le_exists_conv: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
315 |
"(A::'a multiset) \<le> B \<longleftrightarrow> (\<exists>C. B = A + C)" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
316 |
apply (unfold mset_le_def, rule iffI, rule_tac x = "B - A" in exI) |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
317 |
apply (auto intro: multiset_eq_iff [THEN iffD2]) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
318 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
319 |
|
52289 | 320 |
instance multiset :: (type) ordered_cancel_comm_monoid_diff |
321 |
by default (simp, fact mset_le_exists_conv) |
|
322 |
||
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
323 |
lemma mset_le_mono_add_right_cancel [simp]: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
324 |
"(A::'a multiset) + C \<le> B + C \<longleftrightarrow> A \<le> B" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
325 |
by (fact add_le_cancel_right) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
326 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
327 |
lemma mset_le_mono_add_left_cancel [simp]: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
328 |
"C + (A::'a multiset) \<le> C + B \<longleftrightarrow> A \<le> B" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
329 |
by (fact add_le_cancel_left) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
330 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
331 |
lemma mset_le_mono_add: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
332 |
"(A::'a multiset) \<le> B \<Longrightarrow> C \<le> D \<Longrightarrow> A + C \<le> B + D" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
333 |
by (fact add_mono) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
334 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
335 |
lemma mset_le_add_left [simp]: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
336 |
"(A::'a multiset) \<le> A + B" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
337 |
unfolding mset_le_def by auto |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
338 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
339 |
lemma mset_le_add_right [simp]: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
340 |
"B \<le> (A::'a multiset) + B" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
341 |
unfolding mset_le_def by auto |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
342 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
343 |
lemma mset_le_single: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
344 |
"a :# B \<Longrightarrow> {#a#} \<le> B" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
345 |
by (simp add: mset_le_def) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
346 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
347 |
lemma multiset_diff_union_assoc: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
348 |
"C \<le> B \<Longrightarrow> (A::'a multiset) + B - C = A + (B - C)" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
349 |
by (simp add: multiset_eq_iff mset_le_def) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
350 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
351 |
lemma mset_le_multiset_union_diff_commute: |
36867 | 352 |
"B \<le> A \<Longrightarrow> (A::'a multiset) - B + C = A + C - B" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
353 |
by (simp add: multiset_eq_iff mset_le_def) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
354 |
|
39301 | 355 |
lemma diff_le_self[simp]: "(M::'a multiset) - N \<le> M" |
356 |
by(simp add: mset_le_def) |
|
357 |
||
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
358 |
lemma mset_lessD: "A < B \<Longrightarrow> x \<in># A \<Longrightarrow> x \<in># B" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
359 |
apply (clarsimp simp: mset_le_def mset_less_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
360 |
apply (erule_tac x=x in allE) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
361 |
apply auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
362 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
363 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
364 |
lemma mset_leD: "A \<le> B \<Longrightarrow> x \<in># A \<Longrightarrow> x \<in># B" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
365 |
apply (clarsimp simp: mset_le_def mset_less_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
366 |
apply (erule_tac x = x in allE) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
367 |
apply auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
368 |
done |
58425 | 369 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
370 |
lemma mset_less_insertD: "(A + {#x#} < B) \<Longrightarrow> (x \<in># B \<and> A < B)" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
371 |
apply (rule conjI) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
372 |
apply (simp add: mset_lessD) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
373 |
apply (clarsimp simp: mset_le_def mset_less_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
374 |
apply safe |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
375 |
apply (erule_tac x = a in allE) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
376 |
apply (auto split: split_if_asm) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
377 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
378 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
379 |
lemma mset_le_insertD: "(A + {#x#} \<le> B) \<Longrightarrow> (x \<in># B \<and> A \<le> B)" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
380 |
apply (rule conjI) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
381 |
apply (simp add: mset_leD) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
382 |
apply (force simp: mset_le_def mset_less_def split: split_if_asm) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
383 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
384 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
385 |
lemma mset_less_of_empty[simp]: "A < {#} \<longleftrightarrow> False" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
386 |
by (auto simp add: mset_less_def mset_le_def multiset_eq_iff) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
387 |
|
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
388 |
lemma empty_le[simp]: "{#} \<le> A" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
389 |
unfolding mset_le_exists_conv by auto |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
390 |
|
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
391 |
lemma le_empty[simp]: "(M \<le> {#}) = (M = {#})" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
392 |
unfolding mset_le_exists_conv by auto |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
393 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
394 |
lemma multi_psub_of_add_self[simp]: "A < A + {#x#}" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
395 |
by (auto simp: mset_le_def mset_less_def) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
396 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
397 |
lemma multi_psub_self[simp]: "(A::'a multiset) < A = False" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
398 |
by simp |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
399 |
|
59813 | 400 |
lemma mset_less_add_bothsides: "N + {#x#} < M + {#x#} \<Longrightarrow> N < M" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
401 |
by (fact add_less_imp_less_right) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
402 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
403 |
lemma mset_less_empty_nonempty: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
404 |
"{#} < S \<longleftrightarrow> S \<noteq> {#}" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
405 |
by (auto simp: mset_le_def mset_less_def) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
406 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
407 |
lemma mset_less_diff_self: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
408 |
"c \<in># B \<Longrightarrow> B - {#c#} < B" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
409 |
by (auto simp: mset_le_def mset_less_def multiset_eq_iff) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
410 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
411 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
412 |
subsubsection {* Intersection *} |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
413 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
414 |
instantiation multiset :: (type) semilattice_inf |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
415 |
begin |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
416 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
417 |
definition inf_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" where |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
418 |
multiset_inter_def: "inf_multiset A B = A - (A - B)" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
419 |
|
46921 | 420 |
instance |
421 |
proof - |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
422 |
have aux: "\<And>m n q :: nat. m \<le> n \<Longrightarrow> m \<le> q \<Longrightarrow> m \<le> n - (n - q)" by arith |
46921 | 423 |
show "OFCLASS('a multiset, semilattice_inf_class)" |
424 |
by default (auto simp add: multiset_inter_def mset_le_def aux) |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
425 |
qed |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
426 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
427 |
end |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
428 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
429 |
abbreviation multiset_inter :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" (infixl "#\<inter>" 70) where |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
430 |
"multiset_inter \<equiv> inf" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
431 |
|
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
432 |
lemma multiset_inter_count [simp]: |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
433 |
"count (A #\<inter> B) x = min (count A x) (count B x)" |
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
434 |
by (simp add: multiset_inter_def) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
435 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
436 |
lemma multiset_inter_single: "a \<noteq> b \<Longrightarrow> {#a#} #\<inter> {#b#} = {#}" |
46730 | 437 |
by (rule multiset_eqI) auto |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
438 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
439 |
lemma multiset_union_diff_commute: |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
440 |
assumes "B #\<inter> C = {#}" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
441 |
shows "A + B - C = A - C + B" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
442 |
proof (rule multiset_eqI) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
443 |
fix x |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
444 |
from assms have "min (count B x) (count C x) = 0" |
46730 | 445 |
by (auto simp add: multiset_eq_iff) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
446 |
then have "count B x = 0 \<or> count C x = 0" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
447 |
by auto |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
448 |
then show "count (A + B - C) x = count (A - C + B) x" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
449 |
by auto |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
450 |
qed |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
451 |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
452 |
lemma empty_inter [simp]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
453 |
"{#} #\<inter> M = {#}" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
454 |
by (simp add: multiset_eq_iff) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
455 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
456 |
lemma inter_empty [simp]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
457 |
"M #\<inter> {#} = {#}" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
458 |
by (simp add: multiset_eq_iff) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
459 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
460 |
lemma inter_add_left1: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
461 |
"\<not> x \<in># N \<Longrightarrow> (M + {#x#}) #\<inter> N = M #\<inter> N" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
462 |
by (simp add: multiset_eq_iff) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
463 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
464 |
lemma inter_add_left2: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
465 |
"x \<in># N \<Longrightarrow> (M + {#x#}) #\<inter> N = (M #\<inter> (N - {#x#})) + {#x#}" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
466 |
by (simp add: multiset_eq_iff) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
467 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
468 |
lemma inter_add_right1: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
469 |
"\<not> x \<in># N \<Longrightarrow> N #\<inter> (M + {#x#}) = N #\<inter> M" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
470 |
by (simp add: multiset_eq_iff) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
471 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
472 |
lemma inter_add_right2: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
473 |
"x \<in># N \<Longrightarrow> N #\<inter> (M + {#x#}) = ((N - {#x#}) #\<inter> M) + {#x#}" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
474 |
by (simp add: multiset_eq_iff) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
475 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
476 |
|
51623 | 477 |
subsubsection {* Bounded union *} |
478 |
||
479 |
instantiation multiset :: (type) semilattice_sup |
|
480 |
begin |
|
481 |
||
482 |
definition sup_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" where |
|
483 |
"sup_multiset A B = A + (B - A)" |
|
484 |
||
485 |
instance |
|
486 |
proof - |
|
487 |
have aux: "\<And>m n q :: nat. m \<le> n \<Longrightarrow> q \<le> n \<Longrightarrow> m + (q - m) \<le> n" by arith |
|
488 |
show "OFCLASS('a multiset, semilattice_sup_class)" |
|
489 |
by default (auto simp add: sup_multiset_def mset_le_def aux) |
|
490 |
qed |
|
491 |
||
492 |
end |
|
493 |
||
494 |
abbreviation sup_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" (infixl "#\<union>" 70) where |
|
495 |
"sup_multiset \<equiv> sup" |
|
496 |
||
497 |
lemma sup_multiset_count [simp]: |
|
498 |
"count (A #\<union> B) x = max (count A x) (count B x)" |
|
499 |
by (simp add: sup_multiset_def) |
|
500 |
||
501 |
lemma empty_sup [simp]: |
|
502 |
"{#} #\<union> M = M" |
|
503 |
by (simp add: multiset_eq_iff) |
|
504 |
||
505 |
lemma sup_empty [simp]: |
|
506 |
"M #\<union> {#} = M" |
|
507 |
by (simp add: multiset_eq_iff) |
|
508 |
||
509 |
lemma sup_add_left1: |
|
510 |
"\<not> x \<in># N \<Longrightarrow> (M + {#x#}) #\<union> N = (M #\<union> N) + {#x#}" |
|
511 |
by (simp add: multiset_eq_iff) |
|
512 |
||
513 |
lemma sup_add_left2: |
|
514 |
"x \<in># N \<Longrightarrow> (M + {#x#}) #\<union> N = (M #\<union> (N - {#x#})) + {#x#}" |
|
515 |
by (simp add: multiset_eq_iff) |
|
516 |
||
517 |
lemma sup_add_right1: |
|
518 |
"\<not> x \<in># N \<Longrightarrow> N #\<union> (M + {#x#}) = (N #\<union> M) + {#x#}" |
|
519 |
by (simp add: multiset_eq_iff) |
|
520 |
||
521 |
lemma sup_add_right2: |
|
522 |
"x \<in># N \<Longrightarrow> N #\<union> (M + {#x#}) = ((N - {#x#}) #\<union> M) + {#x#}" |
|
523 |
by (simp add: multiset_eq_iff) |
|
524 |
||
525 |
||
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
526 |
subsubsection {* Filter (with comprehension syntax) *} |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
527 |
|
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
528 |
text {* Multiset comprehension *} |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
529 |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
530 |
lift_definition filter_mset :: "('a \<Rightarrow> bool) \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
531 |
is "\<lambda>P M. \<lambda>x. if P x then M x else 0" |
47429
ec64d94cbf9c
multiset operations are defined with lift_definitions;
bulwahn
parents:
47308
diff
changeset
|
532 |
by (rule filter_preserves_multiset) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
533 |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
534 |
lemma count_filter_mset [simp]: |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
535 |
"count (filter_mset P M) a = (if P a then count M a else 0)" |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
536 |
by (simp add: filter_mset.rep_eq) |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
537 |
|
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
538 |
lemma filter_empty_mset [simp]: |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
539 |
"filter_mset P {#} = {#}" |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
540 |
by (rule multiset_eqI) simp |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
541 |
|
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
542 |
lemma filter_single_mset [simp]: |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
543 |
"filter_mset P {#x#} = (if P x then {#x#} else {#})" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
544 |
by (rule multiset_eqI) simp |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
545 |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
546 |
lemma filter_union_mset [simp]: |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
547 |
"filter_mset P (M + N) = filter_mset P M + filter_mset P N" |
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
548 |
by (rule multiset_eqI) simp |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
549 |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
550 |
lemma filter_diff_mset [simp]: |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
551 |
"filter_mset P (M - N) = filter_mset P M - filter_mset P N" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
552 |
by (rule multiset_eqI) simp |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
553 |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
554 |
lemma filter_inter_mset [simp]: |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
555 |
"filter_mset P (M #\<inter> N) = filter_mset P M #\<inter> filter_mset P N" |
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
556 |
by (rule multiset_eqI) simp |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
557 |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
558 |
lemma multiset_filter_subset[simp]: "filter_mset f M \<le> M" |
58035 | 559 |
unfolding less_eq_multiset.rep_eq by auto |
560 |
||
561 |
lemma multiset_filter_mono: assumes "A \<le> B" |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
562 |
shows "filter_mset f A \<le> filter_mset f B" |
58035 | 563 |
proof - |
564 |
from assms[unfolded mset_le_exists_conv] |
|
565 |
obtain C where B: "B = A + C" by auto |
|
566 |
show ?thesis unfolding B by auto |
|
567 |
qed |
|
568 |
||
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
569 |
syntax |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
570 |
"_MCollect" :: "pttrn \<Rightarrow> 'a multiset \<Rightarrow> bool \<Rightarrow> 'a multiset" ("(1{# _ :# _./ _#})") |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
571 |
syntax (xsymbol) |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
572 |
"_MCollect" :: "pttrn \<Rightarrow> 'a multiset \<Rightarrow> bool \<Rightarrow> 'a multiset" ("(1{# _ \<in># _./ _#})") |
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
573 |
translations |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
574 |
"{#x \<in># M. P#}" == "CONST filter_mset (\<lambda>x. P) M" |
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
575 |
|
10249 | 576 |
|
577 |
subsubsection {* Set of elements *} |
|
578 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
579 |
definition set_of :: "'a multiset => 'a set" where |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
580 |
"set_of M = {x. x :# M}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
581 |
|
17161 | 582 |
lemma set_of_empty [simp]: "set_of {#} = {}" |
26178 | 583 |
by (simp add: set_of_def) |
10249 | 584 |
|
17161 | 585 |
lemma set_of_single [simp]: "set_of {#b#} = {b}" |
26178 | 586 |
by (simp add: set_of_def) |
10249 | 587 |
|
17161 | 588 |
lemma set_of_union [simp]: "set_of (M + N) = set_of M \<union> set_of N" |
26178 | 589 |
by (auto simp add: set_of_def) |
10249 | 590 |
|
17161 | 591 |
lemma set_of_eq_empty_iff [simp]: "(set_of M = {}) = (M = {#})" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
592 |
by (auto simp add: set_of_def multiset_eq_iff) |
10249 | 593 |
|
17161 | 594 |
lemma mem_set_of_iff [simp]: "(x \<in> set_of M) = (x :# M)" |
26178 | 595 |
by (auto simp add: set_of_def) |
26016 | 596 |
|
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
597 |
lemma set_of_filter [simp]: "set_of {# x:#M. P x #} = set_of M \<inter> {x. P x}" |
26178 | 598 |
by (auto simp add: set_of_def) |
10249 | 599 |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
600 |
lemma finite_set_of [iff]: "finite (set_of M)" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
601 |
using count [of M] by (simp add: multiset_def set_of_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
602 |
|
46756
faf62905cd53
adding finiteness of intervals on integer sets; adding another finiteness theorem for multisets
bulwahn
parents:
46730
diff
changeset
|
603 |
lemma finite_Collect_mem [iff]: "finite {x. x :# M}" |
faf62905cd53
adding finiteness of intervals on integer sets; adding another finiteness theorem for multisets
bulwahn
parents:
46730
diff
changeset
|
604 |
unfolding set_of_def[symmetric] by simp |
10249 | 605 |
|
58425 | 606 |
lemma set_of_mono: "A \<le> B \<Longrightarrow> set_of A \<subseteq> set_of B" |
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
607 |
by (metis mset_leD subsetI mem_set_of_iff) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
608 |
|
59813 | 609 |
lemma ball_set_of_iff: "(\<forall>x \<in> set_of M. P x) \<longleftrightarrow> (\<forall>x. x \<in># M \<longrightarrow> P x)" |
610 |
by auto |
|
611 |
||
612 |
||
10249 | 613 |
subsubsection {* Size *} |
614 |
||
56656 | 615 |
definition wcount where "wcount f M = (\<lambda>x. count M x * Suc (f x))" |
616 |
||
617 |
lemma wcount_union: "wcount f (M + N) a = wcount f M a + wcount f N a" |
|
618 |
by (auto simp: wcount_def add_mult_distrib) |
|
619 |
||
620 |
definition size_multiset :: "('a \<Rightarrow> nat) \<Rightarrow> 'a multiset \<Rightarrow> nat" where |
|
621 |
"size_multiset f M = setsum (wcount f M) (set_of M)" |
|
622 |
||
623 |
lemmas size_multiset_eq = size_multiset_def[unfolded wcount_def] |
|
624 |
||
625 |
instantiation multiset :: (type) size begin |
|
626 |
definition size_multiset where |
|
627 |
size_multiset_overloaded_def: "size_multiset = Multiset.size_multiset (\<lambda>_. 0)" |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
628 |
instance .. |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
629 |
end |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
630 |
|
56656 | 631 |
lemmas size_multiset_overloaded_eq = |
632 |
size_multiset_overloaded_def[THEN fun_cong, unfolded size_multiset_eq, simplified] |
|
633 |
||
634 |
lemma size_multiset_empty [simp]: "size_multiset f {#} = 0" |
|
635 |
by (simp add: size_multiset_def) |
|
636 |
||
28708
a1a436f09ec6
explicit check for pattern discipline before code translation
haftmann
parents:
28562
diff
changeset
|
637 |
lemma size_empty [simp]: "size {#} = 0" |
56656 | 638 |
by (simp add: size_multiset_overloaded_def) |
639 |
||
640 |
lemma size_multiset_single [simp]: "size_multiset f {#b#} = Suc (f b)" |
|
641 |
by (simp add: size_multiset_eq) |
|
10249 | 642 |
|
28708
a1a436f09ec6
explicit check for pattern discipline before code translation
haftmann
parents:
28562
diff
changeset
|
643 |
lemma size_single [simp]: "size {#b#} = 1" |
56656 | 644 |
by (simp add: size_multiset_overloaded_def) |
645 |
||
646 |
lemma setsum_wcount_Int: |
|
647 |
"finite A \<Longrightarrow> setsum (wcount f N) (A \<inter> set_of N) = setsum (wcount f N) A" |
|
26178 | 648 |
apply (induct rule: finite_induct) |
649 |
apply simp |
|
56656 | 650 |
apply (simp add: Int_insert_left set_of_def wcount_def) |
651 |
done |
|
652 |
||
653 |
lemma size_multiset_union [simp]: |
|
654 |
"size_multiset f (M + N::'a multiset) = size_multiset f M + size_multiset f N" |
|
57418 | 655 |
apply (simp add: size_multiset_def setsum_Un_nat setsum.distrib setsum_wcount_Int wcount_union) |
56656 | 656 |
apply (subst Int_commute) |
657 |
apply (simp add: setsum_wcount_Int) |
|
26178 | 658 |
done |
10249 | 659 |
|
28708
a1a436f09ec6
explicit check for pattern discipline before code translation
haftmann
parents:
28562
diff
changeset
|
660 |
lemma size_union [simp]: "size (M + N::'a multiset) = size M + size N" |
56656 | 661 |
by (auto simp add: size_multiset_overloaded_def) |
662 |
||
663 |
lemma size_multiset_eq_0_iff_empty [iff]: "(size_multiset f M = 0) = (M = {#})" |
|
664 |
by (auto simp add: size_multiset_eq multiset_eq_iff) |
|
10249 | 665 |
|
17161 | 666 |
lemma size_eq_0_iff_empty [iff]: "(size M = 0) = (M = {#})" |
56656 | 667 |
by (auto simp add: size_multiset_overloaded_def) |
26016 | 668 |
|
669 |
lemma nonempty_has_size: "(S \<noteq> {#}) = (0 < size S)" |
|
26178 | 670 |
by (metis gr0I gr_implies_not0 size_empty size_eq_0_iff_empty) |
10249 | 671 |
|
17161 | 672 |
lemma size_eq_Suc_imp_elem: "size M = Suc n ==> \<exists>a. a :# M" |
56656 | 673 |
apply (unfold size_multiset_overloaded_eq) |
26178 | 674 |
apply (drule setsum_SucD) |
675 |
apply auto |
|
676 |
done |
|
10249 | 677 |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
678 |
lemma size_eq_Suc_imp_eq_union: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
679 |
assumes "size M = Suc n" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
680 |
shows "\<exists>a N. M = N + {#a#}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
681 |
proof - |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
682 |
from assms obtain a where "a \<in># M" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
683 |
by (erule size_eq_Suc_imp_elem [THEN exE]) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
684 |
then have "M = M - {#a#} + {#a#}" by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
685 |
then show ?thesis by blast |
23611 | 686 |
qed |
15869 | 687 |
|
59949 | 688 |
lemma size_mset_mono: assumes "A \<le> B" |
689 |
shows "size A \<le> size(B::_ multiset)" |
|
690 |
proof - |
|
691 |
from assms[unfolded mset_le_exists_conv] |
|
692 |
obtain C where B: "B = A + C" by auto |
|
693 |
show ?thesis unfolding B by (induct C, auto) |
|
694 |
qed |
|
695 |
||
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
696 |
lemma size_filter_mset_lesseq[simp]: "size (filter_mset f M) \<le> size M" |
59949 | 697 |
by (rule size_mset_mono[OF multiset_filter_subset]) |
698 |
||
699 |
lemma size_Diff_submset: |
|
700 |
"M \<le> M' \<Longrightarrow> size (M' - M) = size M' - size(M::'a multiset)" |
|
701 |
by (metis add_diff_cancel_left' size_union mset_le_exists_conv) |
|
26016 | 702 |
|
703 |
subsection {* Induction and case splits *} |
|
10249 | 704 |
|
18258 | 705 |
theorem multiset_induct [case_names empty add, induct type: multiset]: |
48009 | 706 |
assumes empty: "P {#}" |
707 |
assumes add: "\<And>M x. P M \<Longrightarrow> P (M + {#x#})" |
|
708 |
shows "P M" |
|
709 |
proof (induct n \<equiv> "size M" arbitrary: M) |
|
710 |
case 0 thus "P M" by (simp add: empty) |
|
711 |
next |
|
712 |
case (Suc k) |
|
713 |
obtain N x where "M = N + {#x#}" |
|
714 |
using `Suc k = size M` [symmetric] |
|
715 |
using size_eq_Suc_imp_eq_union by fast |
|
716 |
with Suc add show "P M" by simp |
|
10249 | 717 |
qed |
718 |
||
25610 | 719 |
lemma multi_nonempty_split: "M \<noteq> {#} \<Longrightarrow> \<exists>A a. M = A + {#a#}" |
26178 | 720 |
by (induct M) auto |
25610 | 721 |
|
55913 | 722 |
lemma multiset_cases [cases type]: |
723 |
obtains (empty) "M = {#}" |
|
724 |
| (add) N x where "M = N + {#x#}" |
|
725 |
using assms by (induct M) simp_all |
|
25610 | 726 |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
727 |
lemma multi_drop_mem_not_eq: "c \<in># B \<Longrightarrow> B - {#c#} \<noteq> B" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
728 |
by (cases "B = {#}") (auto dest: multi_member_split) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
729 |
|
26033 | 730 |
lemma multiset_partition: "M = {# x:#M. P x #} + {# x:#M. \<not> P x #}" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
731 |
apply (subst multiset_eq_iff) |
26178 | 732 |
apply auto |
733 |
done |
|
10249 | 734 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
735 |
lemma mset_less_size: "(A::'a multiset) < B \<Longrightarrow> size A < size B" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
736 |
proof (induct A arbitrary: B) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
737 |
case (empty M) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
738 |
then have "M \<noteq> {#}" by (simp add: mset_less_empty_nonempty) |
58425 | 739 |
then obtain M' x where "M = M' + {#x#}" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
740 |
by (blast dest: multi_nonempty_split) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
741 |
then show ?case by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
742 |
next |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
743 |
case (add S x T) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
744 |
have IH: "\<And>B. S < B \<Longrightarrow> size S < size B" by fact |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
745 |
have SxsubT: "S + {#x#} < T" by fact |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
746 |
then have "x \<in># T" and "S < T" by (auto dest: mset_less_insertD) |
58425 | 747 |
then obtain T' where T: "T = T' + {#x#}" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
748 |
by (blast dest: multi_member_split) |
58425 | 749 |
then have "S < T'" using SxsubT |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
750 |
by (blast intro: mset_less_add_bothsides) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
751 |
then have "size S < size T'" using IH by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
752 |
then show ?case using T by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
753 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
754 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
755 |
|
59949 | 756 |
lemma size_1_singleton_mset: "size M = 1 \<Longrightarrow> \<exists>a. M = {#a#}" |
757 |
by (cases M) auto |
|
758 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
759 |
subsubsection {* Strong induction and subset induction for multisets *} |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
760 |
|
58098 | 761 |
text {* Well-foundedness of strict subset relation *} |
762 |
||
763 |
lemma wf_less_mset_rel: "wf {(M, N :: 'a multiset). M < N}" |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
764 |
apply (rule wf_measure [THEN wf_subset, where f1=size]) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
765 |
apply (clarsimp simp: measure_def inv_image_def mset_less_size) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
766 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
767 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
768 |
lemma full_multiset_induct [case_names less]: |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
769 |
assumes ih: "\<And>B. \<forall>(A::'a multiset). A < B \<longrightarrow> P A \<Longrightarrow> P B" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
770 |
shows "P B" |
58098 | 771 |
apply (rule wf_less_mset_rel [THEN wf_induct]) |
772 |
apply (rule ih, auto) |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
773 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
774 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
775 |
lemma multi_subset_induct [consumes 2, case_names empty add]: |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
776 |
assumes "F \<le> A" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
777 |
and empty: "P {#}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
778 |
and insert: "\<And>a F. a \<in># A \<Longrightarrow> P F \<Longrightarrow> P (F + {#a#})" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
779 |
shows "P F" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
780 |
proof - |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
781 |
from `F \<le> A` |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
782 |
show ?thesis |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
783 |
proof (induct F) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
784 |
show "P {#}" by fact |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
785 |
next |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
786 |
fix x F |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
787 |
assume P: "F \<le> A \<Longrightarrow> P F" and i: "F + {#x#} \<le> A" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
788 |
show "P (F + {#x#})" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
789 |
proof (rule insert) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
790 |
from i show "x \<in># A" by (auto dest: mset_le_insertD) |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
791 |
from i have "F \<le> A" by (auto dest: mset_le_insertD) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
792 |
with P show "P F" . |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
793 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
794 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
795 |
qed |
26145 | 796 |
|
17161 | 797 |
|
48023 | 798 |
subsection {* The fold combinator *} |
799 |
||
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
800 |
definition fold_mset :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'b \<Rightarrow> 'a multiset \<Rightarrow> 'b" |
48023 | 801 |
where |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
802 |
"fold_mset f s M = Finite_Set.fold (\<lambda>x. f x ^^ count M x) s (set_of M)" |
48023 | 803 |
|
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
804 |
lemma fold_mset_empty [simp]: |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
805 |
"fold_mset f s {#} = s" |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
806 |
by (simp add: fold_mset_def) |
48023 | 807 |
|
808 |
context comp_fun_commute |
|
809 |
begin |
|
810 |
||
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
811 |
lemma fold_mset_insert: |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
812 |
"fold_mset f s (M + {#x#}) = f x (fold_mset f s M)" |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
813 |
proof - |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
814 |
interpret mset: comp_fun_commute "\<lambda>y. f y ^^ count M y" |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
815 |
by (fact comp_fun_commute_funpow) |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
816 |
interpret mset_union: comp_fun_commute "\<lambda>y. f y ^^ count (M + {#x#}) y" |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
817 |
by (fact comp_fun_commute_funpow) |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
818 |
show ?thesis |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
819 |
proof (cases "x \<in> set_of M") |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
820 |
case False |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
821 |
then have *: "count (M + {#x#}) x = 1" by simp |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
822 |
from False have "Finite_Set.fold (\<lambda>y. f y ^^ count (M + {#x#}) y) s (set_of M) = |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
823 |
Finite_Set.fold (\<lambda>y. f y ^^ count M y) s (set_of M)" |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
824 |
by (auto intro!: Finite_Set.fold_cong comp_fun_commute_funpow) |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
825 |
with False * show ?thesis |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
826 |
by (simp add: fold_mset_def del: count_union) |
48023 | 827 |
next |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
828 |
case True |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
829 |
def N \<equiv> "set_of M - {x}" |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
830 |
from N_def True have *: "set_of M = insert x N" "x \<notin> N" "finite N" by auto |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
831 |
then have "Finite_Set.fold (\<lambda>y. f y ^^ count (M + {#x#}) y) s N = |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
832 |
Finite_Set.fold (\<lambda>y. f y ^^ count M y) s N" |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
833 |
by (auto intro!: Finite_Set.fold_cong comp_fun_commute_funpow) |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
834 |
with * show ?thesis by (simp add: fold_mset_def del: count_union) simp |
48023 | 835 |
qed |
836 |
qed |
|
837 |
||
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
838 |
corollary fold_mset_single [simp]: |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
839 |
"fold_mset f s {#x#} = f x s" |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
840 |
proof - |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
841 |
have "fold_mset f s ({#} + {#x#}) = f x s" by (simp only: fold_mset_insert) simp |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
842 |
then show ?thesis by simp |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
843 |
qed |
48023 | 844 |
|
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
845 |
lemma fold_mset_fun_left_comm: |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
846 |
"f x (fold_mset f s M) = fold_mset f (f x s) M" |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
847 |
by (induct M) (simp_all add: fold_mset_insert fun_left_comm) |
48023 | 848 |
|
849 |
lemma fold_mset_union [simp]: |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
850 |
"fold_mset f s (M + N) = fold_mset f (fold_mset f s M) N" |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
851 |
proof (induct M) |
48023 | 852 |
case empty then show ?case by simp |
853 |
next |
|
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
854 |
case (add M x) |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
855 |
have "M + {#x#} + N = (M + N) + {#x#}" |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
856 |
by (simp add: ac_simps) |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
857 |
with add show ?case by (simp add: fold_mset_insert fold_mset_fun_left_comm) |
48023 | 858 |
qed |
859 |
||
860 |
lemma fold_mset_fusion: |
|
861 |
assumes "comp_fun_commute g" |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
862 |
shows "(\<And>x y. h (g x y) = f x (h y)) \<Longrightarrow> h (fold_mset g w A) = fold_mset f (h w) A" (is "PROP ?P") |
48023 | 863 |
proof - |
864 |
interpret comp_fun_commute g by (fact assms) |
|
865 |
show "PROP ?P" by (induct A) auto |
|
866 |
qed |
|
867 |
||
868 |
end |
|
869 |
||
870 |
text {* |
|
871 |
A note on code generation: When defining some function containing a |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
872 |
subterm @{term "fold_mset F"}, code generation is not automatic. When |
48023 | 873 |
interpreting locale @{text left_commutative} with @{text F}, the |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
874 |
would be code thms for @{const fold_mset} become thms like |
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
875 |
@{term "fold_mset F z {#} = z"} where @{text F} is not a pattern but |
48023 | 876 |
contains defined symbols, i.e.\ is not a code thm. Hence a separate |
877 |
constant with its own code thms needs to be introduced for @{text |
|
878 |
F}. See the image operator below. |
|
879 |
*} |
|
880 |
||
881 |
||
882 |
subsection {* Image *} |
|
883 |
||
884 |
definition image_mset :: "('a \<Rightarrow> 'b) \<Rightarrow> 'a multiset \<Rightarrow> 'b multiset" where |
|
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
885 |
"image_mset f = fold_mset (plus o single o f) {#}" |
48023 | 886 |
|
49823 | 887 |
lemma comp_fun_commute_mset_image: |
888 |
"comp_fun_commute (plus o single o f)" |
|
889 |
proof |
|
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
890 |
qed (simp add: ac_simps fun_eq_iff) |
48023 | 891 |
|
892 |
lemma image_mset_empty [simp]: "image_mset f {#} = {#}" |
|
49823 | 893 |
by (simp add: image_mset_def) |
48023 | 894 |
|
895 |
lemma image_mset_single [simp]: "image_mset f {#x#} = {#f x#}" |
|
49823 | 896 |
proof - |
897 |
interpret comp_fun_commute "plus o single o f" |
|
898 |
by (fact comp_fun_commute_mset_image) |
|
899 |
show ?thesis by (simp add: image_mset_def) |
|
900 |
qed |
|
48023 | 901 |
|
902 |
lemma image_mset_union [simp]: |
|
49823 | 903 |
"image_mset f (M + N) = image_mset f M + image_mset f N" |
904 |
proof - |
|
905 |
interpret comp_fun_commute "plus o single o f" |
|
906 |
by (fact comp_fun_commute_mset_image) |
|
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
907 |
show ?thesis by (induct N) (simp_all add: image_mset_def ac_simps) |
49823 | 908 |
qed |
909 |
||
910 |
corollary image_mset_insert: |
|
911 |
"image_mset f (M + {#a#}) = image_mset f M + {#f a#}" |
|
912 |
by simp |
|
48023 | 913 |
|
49823 | 914 |
lemma set_of_image_mset [simp]: |
915 |
"set_of (image_mset f M) = image f (set_of M)" |
|
916 |
by (induct M) simp_all |
|
48040 | 917 |
|
49823 | 918 |
lemma size_image_mset [simp]: |
919 |
"size (image_mset f M) = size M" |
|
920 |
by (induct M) simp_all |
|
48023 | 921 |
|
49823 | 922 |
lemma image_mset_is_empty_iff [simp]: |
923 |
"image_mset f M = {#} \<longleftrightarrow> M = {#}" |
|
924 |
by (cases M) auto |
|
48023 | 925 |
|
926 |
syntax |
|
927 |
"_comprehension1_mset" :: "'a \<Rightarrow> 'b \<Rightarrow> 'b multiset \<Rightarrow> 'a multiset" |
|
928 |
("({#_/. _ :# _#})") |
|
929 |
translations |
|
930 |
"{#e. x:#M#}" == "CONST image_mset (%x. e) M" |
|
931 |
||
59813 | 932 |
syntax (xsymbols) |
933 |
"_comprehension2_mset" :: "'a \<Rightarrow> 'b \<Rightarrow> 'b multiset \<Rightarrow> 'a multiset" |
|
934 |
("({#_/. _ \<in># _#})") |
|
935 |
translations |
|
936 |
"{#e. x \<in># M#}" == "CONST image_mset (\<lambda>x. e) M" |
|
937 |
||
48023 | 938 |
syntax |
59813 | 939 |
"_comprehension3_mset" :: "'a \<Rightarrow> 'b \<Rightarrow> 'b multiset \<Rightarrow> bool \<Rightarrow> 'a multiset" |
48023 | 940 |
("({#_/ | _ :# _./ _#})") |
941 |
translations |
|
942 |
"{#e | x:#M. P#}" => "{#e. x :# {# x:#M. P#}#}" |
|
943 |
||
59813 | 944 |
syntax |
945 |
"_comprehension4_mset" :: "'a \<Rightarrow> 'b \<Rightarrow> 'b multiset \<Rightarrow> bool \<Rightarrow> 'a multiset" |
|
946 |
("({#_/ | _ \<in># _./ _#})") |
|
947 |
translations |
|
948 |
"{#e | x\<in>#M. P#}" => "{#e. x \<in># {# x\<in>#M. P#}#}" |
|
949 |
||
48023 | 950 |
text {* |
951 |
This allows to write not just filters like @{term "{#x:#M. x<c#}"} |
|
952 |
but also images like @{term "{#x+x. x:#M #}"} and @{term [source] |
|
953 |
"{#x+x|x:#M. x<c#}"}, where the latter is currently displayed as |
|
954 |
@{term "{#x+x|x:#M. x<c#}"}. |
|
955 |
*} |
|
956 |
||
59813 | 957 |
lemma in_image_mset: "y \<in># {#f x. x \<in># M#} \<longleftrightarrow> y \<in> f ` set_of M" |
958 |
by (metis mem_set_of_iff set_of_image_mset) |
|
959 |
||
55467
a5c9002bc54d
renamed 'enriched_type' to more informative 'functor' (following the renaming of enriched type constructors to bounded natural functors)
blanchet
parents:
55417
diff
changeset
|
960 |
functor image_mset: image_mset |
48023 | 961 |
proof - |
962 |
fix f g show "image_mset f \<circ> image_mset g = image_mset (f \<circ> g)" |
|
963 |
proof |
|
964 |
fix A |
|
965 |
show "(image_mset f \<circ> image_mset g) A = image_mset (f \<circ> g) A" |
|
966 |
by (induct A) simp_all |
|
967 |
qed |
|
968 |
show "image_mset id = id" |
|
969 |
proof |
|
970 |
fix A |
|
971 |
show "image_mset id A = id A" |
|
972 |
by (induct A) simp_all |
|
973 |
qed |
|
974 |
qed |
|
975 |
||
59813 | 976 |
declare |
977 |
image_mset.id [simp] |
|
978 |
image_mset.identity [simp] |
|
979 |
||
980 |
lemma image_mset_id[simp]: "image_mset id x = x" |
|
981 |
unfolding id_def by auto |
|
982 |
||
983 |
lemma image_mset_cong: "(\<And>x. x \<in># M \<Longrightarrow> f x = g x) \<Longrightarrow> {#f x. x \<in># M#} = {#g x. x \<in># M#}" |
|
984 |
by (induct M) auto |
|
985 |
||
986 |
lemma image_mset_cong_pair: |
|
987 |
"(\<forall>x y. (x, y) \<in># M \<longrightarrow> f x y = g x y) \<Longrightarrow> {#f x y. (x, y) \<in># M#} = {#g x y. (x, y) \<in># M#}" |
|
988 |
by (metis image_mset_cong split_cong) |
|
49717 | 989 |
|
48023 | 990 |
|
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
991 |
subsection {* Further conversions *} |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
992 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
993 |
primrec multiset_of :: "'a list \<Rightarrow> 'a multiset" where |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
994 |
"multiset_of [] = {#}" | |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
995 |
"multiset_of (a # x) = multiset_of x + {# a #}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
996 |
|
37107 | 997 |
lemma in_multiset_in_set: |
998 |
"x \<in># multiset_of xs \<longleftrightarrow> x \<in> set xs" |
|
999 |
by (induct xs) simp_all |
|
1000 |
||
1001 |
lemma count_multiset_of: |
|
1002 |
"count (multiset_of xs) x = length (filter (\<lambda>y. x = y) xs)" |
|
1003 |
by (induct xs) simp_all |
|
1004 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1005 |
lemma multiset_of_zero_iff[simp]: "(multiset_of x = {#}) = (x = [])" |
59813 | 1006 |
by (induct x) auto |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1007 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1008 |
lemma multiset_of_zero_iff_right[simp]: "({#} = multiset_of x) = (x = [])" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1009 |
by (induct x) auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1010 |
|
40950 | 1011 |
lemma set_of_multiset_of[simp]: "set_of (multiset_of x) = set x" |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1012 |
by (induct x) auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1013 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1014 |
lemma mem_set_multiset_eq: "x \<in> set xs = (x :# multiset_of xs)" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1015 |
by (induct xs) auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1016 |
|
48012 | 1017 |
lemma size_multiset_of [simp]: "size (multiset_of xs) = length xs" |
1018 |
by (induct xs) simp_all |
|
1019 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1020 |
lemma multiset_of_append [simp]: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1021 |
"multiset_of (xs @ ys) = multiset_of xs + multiset_of ys" |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1022 |
by (induct xs arbitrary: ys) (auto simp: ac_simps) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1023 |
|
40303
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1024 |
lemma multiset_of_filter: |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1025 |
"multiset_of (filter P xs) = {#x :# multiset_of xs. P x #}" |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1026 |
by (induct xs) simp_all |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1027 |
|
40950 | 1028 |
lemma multiset_of_rev [simp]: |
1029 |
"multiset_of (rev xs) = multiset_of xs" |
|
1030 |
by (induct xs) simp_all |
|
1031 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1032 |
lemma surj_multiset_of: "surj multiset_of" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1033 |
apply (unfold surj_def) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1034 |
apply (rule allI) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1035 |
apply (rule_tac M = y in multiset_induct) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1036 |
apply auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1037 |
apply (rule_tac x = "x # xa" in exI) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1038 |
apply auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1039 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1040 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1041 |
lemma set_count_greater_0: "set x = {a. count (multiset_of x) a > 0}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1042 |
by (induct x) auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1043 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1044 |
lemma distinct_count_atmost_1: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1045 |
"distinct x = (! a. count (multiset_of x) a = (if a \<in> set x then 1 else 0))" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1046 |
apply (induct x, simp, rule iffI, simp_all) |
55417
01fbfb60c33e
adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems
blanchet
parents:
55129
diff
changeset
|
1047 |
apply (rename_tac a b) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1048 |
apply (rule conjI) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1049 |
apply (simp_all add: set_of_multiset_of [THEN sym] del: set_of_multiset_of) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1050 |
apply (erule_tac x = a in allE, simp, clarify) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1051 |
apply (erule_tac x = aa in allE, simp) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1052 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1053 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1054 |
lemma multiset_of_eq_setD: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1055 |
"multiset_of xs = multiset_of ys \<Longrightarrow> set xs = set ys" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
1056 |
by (rule) (auto simp add:multiset_eq_iff set_count_greater_0) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1057 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1058 |
lemma set_eq_iff_multiset_of_eq_distinct: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1059 |
"distinct x \<Longrightarrow> distinct y \<Longrightarrow> |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1060 |
(set x = set y) = (multiset_of x = multiset_of y)" |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
1061 |
by (auto simp: multiset_eq_iff distinct_count_atmost_1) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1062 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1063 |
lemma set_eq_iff_multiset_of_remdups_eq: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1064 |
"(set x = set y) = (multiset_of (remdups x) = multiset_of (remdups y))" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1065 |
apply (rule iffI) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1066 |
apply (simp add: set_eq_iff_multiset_of_eq_distinct[THEN iffD1]) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1067 |
apply (drule distinct_remdups [THEN distinct_remdups |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1068 |
[THEN set_eq_iff_multiset_of_eq_distinct [THEN iffD2]]]) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1069 |
apply simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1070 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1071 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1072 |
lemma multiset_of_compl_union [simp]: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1073 |
"multiset_of [x\<leftarrow>xs. P x] + multiset_of [x\<leftarrow>xs. \<not>P x] = multiset_of xs" |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1074 |
by (induct xs) (auto simp: ac_simps) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1075 |
|
41069
6fabc0414055
name filter operation just filter (c.f. List.filter and list comprehension syntax)
haftmann
parents:
40968
diff
changeset
|
1076 |
lemma count_multiset_of_length_filter: |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1077 |
"count (multiset_of xs) x = length (filter (\<lambda>y. x = y) xs)" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1078 |
by (induct xs) auto |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1079 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1080 |
lemma nth_mem_multiset_of: "i < length ls \<Longrightarrow> (ls ! i) :# multiset_of ls" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1081 |
apply (induct ls arbitrary: i) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1082 |
apply simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1083 |
apply (case_tac i) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1084 |
apply auto |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1085 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1086 |
|
36903 | 1087 |
lemma multiset_of_remove1[simp]: |
1088 |
"multiset_of (remove1 a xs) = multiset_of xs - {#a#}" |
|
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
1089 |
by (induct xs) (auto simp add: multiset_eq_iff) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1090 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1091 |
lemma multiset_of_eq_length: |
37107 | 1092 |
assumes "multiset_of xs = multiset_of ys" |
1093 |
shows "length xs = length ys" |
|
48012 | 1094 |
using assms by (metis size_multiset_of) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1095 |
|
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1096 |
lemma multiset_of_eq_length_filter: |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1097 |
assumes "multiset_of xs = multiset_of ys" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1098 |
shows "length (filter (\<lambda>x. z = x) xs) = length (filter (\<lambda>y. z = y) ys)" |
48012 | 1099 |
using assms by (metis count_multiset_of) |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1100 |
|
45989
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1101 |
lemma fold_multiset_equiv: |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1102 |
assumes f: "\<And>x y. x \<in> set xs \<Longrightarrow> y \<in> set xs \<Longrightarrow> f x \<circ> f y = f y \<circ> f x" |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1103 |
and equiv: "multiset_of xs = multiset_of ys" |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
1104 |
shows "List.fold f xs = List.fold f ys" |
46921 | 1105 |
using f equiv [symmetric] |
1106 |
proof (induct xs arbitrary: ys) |
|
45989
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1107 |
case Nil then show ?case by simp |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1108 |
next |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1109 |
case (Cons x xs) |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1110 |
then have *: "set ys = set (x # xs)" by (blast dest: multiset_of_eq_setD) |
58425 | 1111 |
have "\<And>x y. x \<in> set ys \<Longrightarrow> y \<in> set ys \<Longrightarrow> f x \<circ> f y = f y \<circ> f x" |
45989
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1112 |
by (rule Cons.prems(1)) (simp_all add: *) |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1113 |
moreover from * have "x \<in> set ys" by simp |
49822
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
1114 |
ultimately have "List.fold f ys = List.fold f (remove1 x ys) \<circ> f x" by (fact fold_remove1_split) |
0cfc1651be25
simplified construction of fold combinator on multisets;
haftmann
parents:
49717
diff
changeset
|
1115 |
moreover from Cons.prems have "List.fold f xs = List.fold f (remove1 x ys)" by (auto intro: Cons.hyps) |
45989
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1116 |
ultimately show ?case by simp |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1117 |
qed |
b39256df5f8a
moved theorem requiring multisets from More_List to Multiset
haftmann
parents:
45866
diff
changeset
|
1118 |
|
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1119 |
lemma multiset_of_insort [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1120 |
"multiset_of (insort x xs) = multiset_of xs + {#x#}" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1121 |
by (induct xs) (simp_all add: ac_simps) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1122 |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1123 |
lemma multiset_of_map: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1124 |
"multiset_of (map f xs) = image_mset f (multiset_of xs)" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1125 |
by (induct xs) simp_all |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1126 |
|
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1127 |
definition multiset_of_set :: "'a set \<Rightarrow> 'a multiset" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1128 |
where |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1129 |
"multiset_of_set = folding.F (\<lambda>x M. {#x#} + M) {#}" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1130 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1131 |
interpretation multiset_of_set!: folding "\<lambda>x M. {#x#} + M" "{#}" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1132 |
where |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1133 |
"folding.F (\<lambda>x M. {#x#} + M) {#} = multiset_of_set" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1134 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1135 |
interpret comp_fun_commute "\<lambda>x M. {#x#} + M" by default (simp add: fun_eq_iff ac_simps) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1136 |
show "folding (\<lambda>x M. {#x#} + M)" by default (fact comp_fun_commute) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1137 |
from multiset_of_set_def show "folding.F (\<lambda>x M. {#x#} + M) {#} = multiset_of_set" .. |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1138 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1139 |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1140 |
lemma count_multiset_of_set [simp]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1141 |
"finite A \<Longrightarrow> x \<in> A \<Longrightarrow> count (multiset_of_set A) x = 1" (is "PROP ?P") |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1142 |
"\<not> finite A \<Longrightarrow> count (multiset_of_set A) x = 0" (is "PROP ?Q") |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1143 |
"x \<notin> A \<Longrightarrow> count (multiset_of_set A) x = 0" (is "PROP ?R") |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1144 |
proof - |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1145 |
{ fix A |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1146 |
assume "x \<notin> A" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1147 |
have "count (multiset_of_set A) x = 0" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1148 |
proof (cases "finite A") |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1149 |
case False then show ?thesis by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1150 |
next |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1151 |
case True from True `x \<notin> A` show ?thesis by (induct A) auto |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1152 |
qed |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1153 |
} note * = this |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1154 |
then show "PROP ?P" "PROP ?Q" "PROP ?R" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1155 |
by (auto elim!: Set.set_insert) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1156 |
qed -- {* TODO: maybe define @{const multiset_of_set} also in terms of @{const Abs_multiset} *} |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
1157 |
|
59813 | 1158 |
lemma elem_multiset_of_set[simp, intro]: "finite A \<Longrightarrow> x \<in># multiset_of_set A \<longleftrightarrow> x \<in> A" |
1159 |
by (induct A rule: finite_induct) simp_all |
|
1160 |
||
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1161 |
context linorder |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1162 |
begin |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1163 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1164 |
definition sorted_list_of_multiset :: "'a multiset \<Rightarrow> 'a list" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1165 |
where |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
1166 |
"sorted_list_of_multiset M = fold_mset insort [] M" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1167 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1168 |
lemma sorted_list_of_multiset_empty [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1169 |
"sorted_list_of_multiset {#} = []" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1170 |
by (simp add: sorted_list_of_multiset_def) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1171 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1172 |
lemma sorted_list_of_multiset_singleton [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1173 |
"sorted_list_of_multiset {#x#} = [x]" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1174 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1175 |
interpret comp_fun_commute insort by (fact comp_fun_commute_insort) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1176 |
show ?thesis by (simp add: sorted_list_of_multiset_def) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1177 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1178 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1179 |
lemma sorted_list_of_multiset_insert [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1180 |
"sorted_list_of_multiset (M + {#x#}) = List.insort x (sorted_list_of_multiset M)" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1181 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1182 |
interpret comp_fun_commute insort by (fact comp_fun_commute_insort) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1183 |
show ?thesis by (simp add: sorted_list_of_multiset_def) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1184 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1185 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1186 |
end |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1187 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1188 |
lemma multiset_of_sorted_list_of_multiset [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1189 |
"multiset_of (sorted_list_of_multiset M) = M" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1190 |
by (induct M) simp_all |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1191 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1192 |
lemma sorted_list_of_multiset_multiset_of [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1193 |
"sorted_list_of_multiset (multiset_of xs) = sort xs" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1194 |
by (induct xs) simp_all |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1195 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1196 |
lemma finite_set_of_multiset_of_set: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1197 |
assumes "finite A" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1198 |
shows "set_of (multiset_of_set A) = A" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1199 |
using assms by (induct A) simp_all |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1200 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1201 |
lemma infinite_set_of_multiset_of_set: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1202 |
assumes "\<not> finite A" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1203 |
shows "set_of (multiset_of_set A) = {}" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1204 |
using assms by simp |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1205 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1206 |
lemma set_sorted_list_of_multiset [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1207 |
"set (sorted_list_of_multiset M) = set_of M" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1208 |
by (induct M) (simp_all add: set_insort) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1209 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1210 |
lemma sorted_list_of_multiset_of_set [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1211 |
"sorted_list_of_multiset (multiset_of_set A) = sorted_list_of_set A" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1212 |
by (cases "finite A") (induct A rule: finite_induct, simp_all add: ac_simps) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1213 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1214 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1215 |
subsection {* Big operators *} |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1216 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1217 |
no_notation times (infixl "*" 70) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1218 |
no_notation Groups.one ("1") |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1219 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1220 |
locale comm_monoid_mset = comm_monoid |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1221 |
begin |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1222 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1223 |
definition F :: "'a multiset \<Rightarrow> 'a" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1224 |
where |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
1225 |
eq_fold: "F M = fold_mset f 1 M" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1226 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1227 |
lemma empty [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1228 |
"F {#} = 1" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1229 |
by (simp add: eq_fold) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1230 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1231 |
lemma singleton [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1232 |
"F {#x#} = x" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1233 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1234 |
interpret comp_fun_commute |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1235 |
by default (simp add: fun_eq_iff left_commute) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1236 |
show ?thesis by (simp add: eq_fold) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1237 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1238 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1239 |
lemma union [simp]: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1240 |
"F (M + N) = F M * F N" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1241 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1242 |
interpret comp_fun_commute f |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1243 |
by default (simp add: fun_eq_iff left_commute) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1244 |
show ?thesis by (induct N) (simp_all add: left_commute eq_fold) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1245 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1246 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1247 |
end |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1248 |
|
59813 | 1249 |
lemma comp_fun_commute_plus_mset[simp]: "comp_fun_commute (op + \<Colon> 'a multiset \<Rightarrow> _ \<Rightarrow> _)" |
1250 |
by default (simp add: add_ac comp_def) |
|
1251 |
||
1252 |
declare comp_fun_commute.fold_mset_insert[OF comp_fun_commute_plus_mset, simp] |
|
1253 |
||
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
1254 |
lemma in_mset_fold_plus_iff[iff]: "x \<in># fold_mset (op +) M NN \<longleftrightarrow> x \<in># M \<or> (\<exists>N. N \<in># NN \<and> x \<in># N)" |
59813 | 1255 |
by (induct NN) auto |
1256 |
||
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1257 |
notation times (infixl "*" 70) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1258 |
notation Groups.one ("1") |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1259 |
|
54868 | 1260 |
context comm_monoid_add |
1261 |
begin |
|
1262 |
||
1263 |
definition msetsum :: "'a multiset \<Rightarrow> 'a" |
|
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1264 |
where |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1265 |
"msetsum = comm_monoid_mset.F plus 0" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1266 |
|
54868 | 1267 |
sublocale msetsum!: comm_monoid_mset plus 0 |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1268 |
where |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1269 |
"comm_monoid_mset.F plus 0 = msetsum" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1270 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1271 |
show "comm_monoid_mset plus 0" .. |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1272 |
from msetsum_def show "comm_monoid_mset.F plus 0 = msetsum" .. |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1273 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1274 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1275 |
lemma setsum_unfold_msetsum: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1276 |
"setsum f A = msetsum (image_mset f (multiset_of_set A))" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1277 |
by (cases "finite A") (induct A rule: finite_induct, simp_all) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1278 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1279 |
end |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1280 |
|
59813 | 1281 |
lemma msetsum_diff: |
1282 |
fixes M N :: "('a \<Colon> ordered_cancel_comm_monoid_diff) multiset" |
|
1283 |
shows "N \<le> M \<Longrightarrow> msetsum (M - N) = msetsum M - msetsum N" |
|
1284 |
by (metis add_diff_cancel_left' msetsum.union ordered_cancel_comm_monoid_diff_class.add_diff_inverse) |
|
1285 |
||
59949 | 1286 |
lemma size_eq_msetsum: "size M = msetsum (image_mset (\<lambda>_. 1) M)" |
1287 |
proof (induct M) |
|
1288 |
case empty then show ?case by simp |
|
1289 |
next |
|
1290 |
case (add M x) then show ?case |
|
1291 |
by (cases "x \<in> set_of M") |
|
1292 |
(simp_all del: mem_set_of_iff add: size_multiset_overloaded_eq setsum.distrib setsum.delta' insert_absorb, simp) |
|
1293 |
qed |
|
1294 |
||
1295 |
||
59813 | 1296 |
abbreviation Union_mset :: "'a multiset multiset \<Rightarrow> 'a multiset" where |
1297 |
"Union_mset MM \<equiv> msetsum MM" |
|
1298 |
||
1299 |
notation (xsymbols) Union_mset ("\<Union>#_" [900] 900) |
|
1300 |
||
1301 |
lemma set_of_Union_mset[simp]: "set_of (\<Union># MM) = (\<Union>M \<in> set_of MM. set_of M)" |
|
1302 |
by (induct MM) auto |
|
1303 |
||
1304 |
lemma in_Union_mset_iff[iff]: "x \<in># \<Union># MM \<longleftrightarrow> (\<exists>M. M \<in># MM \<and> x \<in># M)" |
|
1305 |
by (induct MM) auto |
|
1306 |
||
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1307 |
syntax |
58425 | 1308 |
"_msetsum_image" :: "pttrn \<Rightarrow> 'b set \<Rightarrow> 'a \<Rightarrow> 'a::comm_monoid_add" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1309 |
("(3SUM _:#_. _)" [0, 51, 10] 10) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1310 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1311 |
syntax (xsymbols) |
58425 | 1312 |
"_msetsum_image" :: "pttrn \<Rightarrow> 'b set \<Rightarrow> 'a \<Rightarrow> 'a::comm_monoid_add" |
57518
2f640245fc6d
refrain from auxiliary abbreviation: be more explicit to the reader in situations where syntax translation does not apply;
haftmann
parents:
57514
diff
changeset
|
1313 |
("(3\<Sum>_\<in>#_. _)" [0, 51, 10] 10) |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1314 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1315 |
syntax (HTML output) |
58425 | 1316 |
"_msetsum_image" :: "pttrn \<Rightarrow> 'b set \<Rightarrow> 'a \<Rightarrow> 'a::comm_monoid_add" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1317 |
("(3\<Sum>_\<in>#_. _)" [0, 51, 10] 10) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1318 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1319 |
translations |
57518
2f640245fc6d
refrain from auxiliary abbreviation: be more explicit to the reader in situations where syntax translation does not apply;
haftmann
parents:
57514
diff
changeset
|
1320 |
"SUM i :# A. b" == "CONST msetsum (CONST image_mset (\<lambda>i. b) A)" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1321 |
|
54868 | 1322 |
context comm_monoid_mult |
1323 |
begin |
|
1324 |
||
1325 |
definition msetprod :: "'a multiset \<Rightarrow> 'a" |
|
1326 |
where |
|
1327 |
"msetprod = comm_monoid_mset.F times 1" |
|
1328 |
||
1329 |
sublocale msetprod!: comm_monoid_mset times 1 |
|
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1330 |
where |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1331 |
"comm_monoid_mset.F times 1 = msetprod" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1332 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1333 |
show "comm_monoid_mset times 1" .. |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1334 |
from msetprod_def show "comm_monoid_mset.F times 1 = msetprod" .. |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1335 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1336 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1337 |
lemma msetprod_empty: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1338 |
"msetprod {#} = 1" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1339 |
by (fact msetprod.empty) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1340 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1341 |
lemma msetprod_singleton: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1342 |
"msetprod {#x#} = x" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1343 |
by (fact msetprod.singleton) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1344 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1345 |
lemma msetprod_Un: |
58425 | 1346 |
"msetprod (A + B) = msetprod A * msetprod B" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1347 |
by (fact msetprod.union) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1348 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1349 |
lemma setprod_unfold_msetprod: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1350 |
"setprod f A = msetprod (image_mset f (multiset_of_set A))" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1351 |
by (cases "finite A") (induct A rule: finite_induct, simp_all) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1352 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1353 |
lemma msetprod_multiplicity: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1354 |
"msetprod M = setprod (\<lambda>x. x ^ count M x) (set_of M)" |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
1355 |
by (simp add: fold_mset_def setprod.eq_fold msetprod.eq_fold funpow_times_power comp_def) |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1356 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1357 |
end |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1358 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1359 |
syntax |
58425 | 1360 |
"_msetprod_image" :: "pttrn \<Rightarrow> 'b set \<Rightarrow> 'a \<Rightarrow> 'a::comm_monoid_mult" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1361 |
("(3PROD _:#_. _)" [0, 51, 10] 10) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1362 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1363 |
syntax (xsymbols) |
58425 | 1364 |
"_msetprod_image" :: "pttrn \<Rightarrow> 'b set \<Rightarrow> 'a \<Rightarrow> 'a::comm_monoid_mult" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1365 |
("(3\<Prod>_\<in>#_. _)" [0, 51, 10] 10) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1366 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1367 |
syntax (HTML output) |
58425 | 1368 |
"_msetprod_image" :: "pttrn \<Rightarrow> 'b set \<Rightarrow> 'a \<Rightarrow> 'a::comm_monoid_mult" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1369 |
("(3\<Prod>_\<in>#_. _)" [0, 51, 10] 10) |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1370 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1371 |
translations |
57518
2f640245fc6d
refrain from auxiliary abbreviation: be more explicit to the reader in situations where syntax translation does not apply;
haftmann
parents:
57514
diff
changeset
|
1372 |
"PROD i :# A. b" == "CONST msetprod (CONST image_mset (\<lambda>i. b) A)" |
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1373 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1374 |
lemma (in comm_semiring_1) dvd_msetprod: |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1375 |
assumes "x \<in># A" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1376 |
shows "x dvd msetprod A" |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1377 |
proof - |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1378 |
from assms have "A = (A - {#x#}) + {#x#}" by simp |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1379 |
then obtain B where "A = B + {#x#}" .. |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1380 |
then show ?thesis by simp |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1381 |
qed |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1382 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1383 |
|
59813 | 1384 |
subsection {* Replicate operation *} |
1385 |
||
1386 |
definition replicate_mset :: "nat \<Rightarrow> 'a \<Rightarrow> 'a multiset" where |
|
1387 |
"replicate_mset n x = ((op + {#x#}) ^^ n) {#}" |
|
1388 |
||
1389 |
lemma replicate_mset_0[simp]: "replicate_mset 0 x = {#}" |
|
1390 |
unfolding replicate_mset_def by simp |
|
1391 |
||
1392 |
lemma replicate_mset_Suc[simp]: "replicate_mset (Suc n) x = replicate_mset n x + {#x#}" |
|
1393 |
unfolding replicate_mset_def by (induct n) (auto intro: add.commute) |
|
1394 |
||
1395 |
lemma in_replicate_mset[simp]: "x \<in># replicate_mset n y \<longleftrightarrow> n > 0 \<and> x = y" |
|
1396 |
unfolding replicate_mset_def by (induct n) simp_all |
|
1397 |
||
1398 |
lemma count_replicate_mset[simp]: "count (replicate_mset n x) y = (if y = x then n else 0)" |
|
1399 |
unfolding replicate_mset_def by (induct n) simp_all |
|
1400 |
||
1401 |
lemma set_of_replicate_mset_subset[simp]: "set_of (replicate_mset n x) = (if n = 0 then {} else {x})" |
|
1402 |
by (auto split: if_splits) |
|
1403 |
||
59949 | 1404 |
lemma size_replicate_mset[simp]: "size (replicate_mset n M) = n" |
59813 | 1405 |
by (induct n, simp_all) |
1406 |
||
1407 |
lemma count_le_replicate_mset_le: "n \<le> count M x \<longleftrightarrow> replicate_mset n x \<le> M" |
|
1408 |
by (auto simp add: assms mset_less_eqI) (metis count_replicate_mset less_eq_multiset.rep_eq) |
|
1409 |
||
1410 |
lemma filter_eq_replicate_mset: "{#y \<in># D. y = x#} = replicate_mset (count D x) x" |
|
1411 |
by (induct D) simp_all |
|
1412 |
||
51548
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1413 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1414 |
subsection {* Alternative representations *} |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1415 |
|
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1416 |
subsubsection {* Lists *} |
757fa47af981
centralized various multiset operations in theory multiset;
haftmann
parents:
51161
diff
changeset
|
1417 |
|
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1418 |
context linorder |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1419 |
begin |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1420 |
|
40210
aee7ef725330
sorting: avoid _key suffix if lemma applies both to simple and generalized variant; generalized insort_insert to insort_insert_key; additional lemmas
haftmann
parents:
39533
diff
changeset
|
1421 |
lemma multiset_of_insort [simp]: |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1422 |
"multiset_of (insort_key k x xs) = {#x#} + multiset_of xs" |
37107 | 1423 |
by (induct xs) (simp_all add: ac_simps) |
58425 | 1424 |
|
40210
aee7ef725330
sorting: avoid _key suffix if lemma applies both to simple and generalized variant; generalized insort_insert to insort_insert_key; additional lemmas
haftmann
parents:
39533
diff
changeset
|
1425 |
lemma multiset_of_sort [simp]: |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1426 |
"multiset_of (sort_key k xs) = multiset_of xs" |
37107 | 1427 |
by (induct xs) (simp_all add: ac_simps) |
1428 |
||
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1429 |
text {* |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1430 |
This lemma shows which properties suffice to show that a function |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1431 |
@{text "f"} with @{text "f xs = ys"} behaves like sort. |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1432 |
*} |
37074 | 1433 |
|
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1434 |
lemma properties_for_sort_key: |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1435 |
assumes "multiset_of ys = multiset_of xs" |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1436 |
and "\<And>k. k \<in> set ys \<Longrightarrow> filter (\<lambda>x. f k = f x) ys = filter (\<lambda>x. f k = f x) xs" |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1437 |
and "sorted (map f ys)" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1438 |
shows "sort_key f xs = ys" |
46921 | 1439 |
using assms |
1440 |
proof (induct xs arbitrary: ys) |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1441 |
case Nil then show ?case by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1442 |
next |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1443 |
case (Cons x xs) |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1444 |
from Cons.prems(2) have |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1445 |
"\<forall>k \<in> set ys. filter (\<lambda>x. f k = f x) (remove1 x ys) = filter (\<lambda>x. f k = f x) xs" |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1446 |
by (simp add: filter_remove1) |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1447 |
with Cons.prems have "sort_key f xs = remove1 x ys" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1448 |
by (auto intro!: Cons.hyps simp add: sorted_map_remove1) |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1449 |
moreover from Cons.prems have "x \<in> set ys" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1450 |
by (auto simp add: mem_set_multiset_eq intro!: ccontr) |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1451 |
ultimately show ?case using Cons.prems by (simp add: insort_key_remove1) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1452 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1453 |
|
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1454 |
lemma properties_for_sort: |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1455 |
assumes multiset: "multiset_of ys = multiset_of xs" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1456 |
and "sorted ys" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1457 |
shows "sort xs = ys" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1458 |
proof (rule properties_for_sort_key) |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1459 |
from multiset show "multiset_of ys = multiset_of xs" . |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1460 |
from `sorted ys` show "sorted (map (\<lambda>x. x) ys)" by simp |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1461 |
from multiset have "\<And>k. length (filter (\<lambda>y. k = y) ys) = length (filter (\<lambda>x. k = x) xs)" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1462 |
by (rule multiset_of_eq_length_filter) |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1463 |
then have "\<And>k. replicate (length (filter (\<lambda>y. k = y) ys)) k = replicate (length (filter (\<lambda>x. k = x) xs)) k" |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1464 |
by simp |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1465 |
then show "\<And>k. k \<in> set ys \<Longrightarrow> filter (\<lambda>y. k = y) ys = filter (\<lambda>x. k = x) xs" |
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1466 |
by (simp add: replicate_length_filter) |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1467 |
qed |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1468 |
|
40303
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1469 |
lemma sort_key_by_quicksort: |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1470 |
"sort_key f xs = sort_key f [x\<leftarrow>xs. f x < f (xs ! (length xs div 2))] |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1471 |
@ [x\<leftarrow>xs. f x = f (xs ! (length xs div 2))] |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1472 |
@ sort_key f [x\<leftarrow>xs. f x > f (xs ! (length xs div 2))]" (is "sort_key f ?lhs = ?rhs") |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1473 |
proof (rule properties_for_sort_key) |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1474 |
show "multiset_of ?rhs = multiset_of ?lhs" |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1475 |
by (rule multiset_eqI) (auto simp add: multiset_of_filter) |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1476 |
next |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1477 |
show "sorted (map f ?rhs)" |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1478 |
by (auto simp add: sorted_append intro: sorted_map_same) |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1479 |
next |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1480 |
fix l |
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1481 |
assume "l \<in> set ?rhs" |
40346 | 1482 |
let ?pivot = "f (xs ! (length xs div 2))" |
1483 |
have *: "\<And>x. f l = f x \<longleftrightarrow> f x = f l" by auto |
|
40306 | 1484 |
have "[x \<leftarrow> sort_key f xs . f x = f l] = [x \<leftarrow> xs. f x = f l]" |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1485 |
unfolding filter_sort by (rule properties_for_sort_key) (auto intro: sorted_map_same) |
40346 | 1486 |
with * have **: "[x \<leftarrow> sort_key f xs . f l = f x] = [x \<leftarrow> xs. f l = f x]" by simp |
1487 |
have "\<And>x P. P (f x) ?pivot \<and> f l = f x \<longleftrightarrow> P (f l) ?pivot \<and> f l = f x" by auto |
|
1488 |
then have "\<And>P. [x \<leftarrow> sort_key f xs . P (f x) ?pivot \<and> f l = f x] = |
|
1489 |
[x \<leftarrow> sort_key f xs. P (f l) ?pivot \<and> f l = f x]" by simp |
|
1490 |
note *** = this [of "op <"] this [of "op >"] this [of "op ="] |
|
40306 | 1491 |
show "[x \<leftarrow> ?rhs. f l = f x] = [x \<leftarrow> ?lhs. f l = f x]" |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1492 |
proof (cases "f l" ?pivot rule: linorder_cases) |
46730 | 1493 |
case less |
1494 |
then have "f l \<noteq> ?pivot" and "\<not> f l > ?pivot" by auto |
|
1495 |
with less show ?thesis |
|
40346 | 1496 |
by (simp add: filter_sort [symmetric] ** ***) |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1497 |
next |
40306 | 1498 |
case equal then show ?thesis |
40346 | 1499 |
by (simp add: * less_le) |
40305
41833242cc42
tuned lemma proposition of properties_for_sort_key
haftmann
parents:
40303
diff
changeset
|
1500 |
next |
46730 | 1501 |
case greater |
1502 |
then have "f l \<noteq> ?pivot" and "\<not> f l < ?pivot" by auto |
|
1503 |
with greater show ?thesis |
|
40346 | 1504 |
by (simp add: filter_sort [symmetric] ** ***) |
40306 | 1505 |
qed |
40303
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1506 |
qed |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1507 |
|
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1508 |
lemma sort_by_quicksort: |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1509 |
"sort xs = sort [x\<leftarrow>xs. x < xs ! (length xs div 2)] |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1510 |
@ [x\<leftarrow>xs. x = xs ! (length xs div 2)] |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1511 |
@ sort [x\<leftarrow>xs. x > xs ! (length xs div 2)]" (is "sort ?lhs = ?rhs") |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1512 |
using sort_key_by_quicksort [of "\<lambda>x. x", symmetric] by simp |
2d507370e879
lemmas multiset_of_filter, sort_key_by_quicksort
haftmann
parents:
40250
diff
changeset
|
1513 |
|
40347
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1514 |
text {* A stable parametrized quicksort *} |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1515 |
|
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1516 |
definition part :: "('b \<Rightarrow> 'a) \<Rightarrow> 'a \<Rightarrow> 'b list \<Rightarrow> 'b list \<times> 'b list \<times> 'b list" where |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1517 |
"part f pivot xs = ([x \<leftarrow> xs. f x < pivot], [x \<leftarrow> xs. f x = pivot], [x \<leftarrow> xs. pivot < f x])" |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1518 |
|
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1519 |
lemma part_code [code]: |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1520 |
"part f pivot [] = ([], [], [])" |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1521 |
"part f pivot (x # xs) = (let (lts, eqs, gts) = part f pivot xs; x' = f x in |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1522 |
if x' < pivot then (x # lts, eqs, gts) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1523 |
else if x' > pivot then (lts, eqs, x # gts) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1524 |
else (lts, x # eqs, gts))" |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1525 |
by (auto simp add: part_def Let_def split_def) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1526 |
|
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1527 |
lemma sort_key_by_quicksort_code [code]: |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1528 |
"sort_key f xs = (case xs of [] \<Rightarrow> [] |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1529 |
| [x] \<Rightarrow> xs |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1530 |
| [x, y] \<Rightarrow> (if f x \<le> f y then xs else [y, x]) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1531 |
| _ \<Rightarrow> (let (lts, eqs, gts) = part f (f (xs ! (length xs div 2))) xs |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1532 |
in sort_key f lts @ eqs @ sort_key f gts))" |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1533 |
proof (cases xs) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1534 |
case Nil then show ?thesis by simp |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1535 |
next |
46921 | 1536 |
case (Cons _ ys) note hyps = Cons show ?thesis |
1537 |
proof (cases ys) |
|
40347
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1538 |
case Nil with hyps show ?thesis by simp |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1539 |
next |
46921 | 1540 |
case (Cons _ zs) note hyps = hyps Cons show ?thesis |
1541 |
proof (cases zs) |
|
40347
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1542 |
case Nil with hyps show ?thesis by auto |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1543 |
next |
58425 | 1544 |
case Cons |
40347
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1545 |
from sort_key_by_quicksort [of f xs] |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1546 |
have "sort_key f xs = (let (lts, eqs, gts) = part f (f (xs ! (length xs div 2))) xs |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1547 |
in sort_key f lts @ eqs @ sort_key f gts)" |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1548 |
by (simp only: split_def Let_def part_def fst_conv snd_conv) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1549 |
with hyps Cons show ?thesis by (simp only: list.cases) |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1550 |
qed |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1551 |
qed |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1552 |
qed |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1553 |
|
39533
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1554 |
end |
91a0ff0ff237
generalized lemmas multiset_of_insort, multiset_of_sort, properties_for_sort for *_key variants
haftmann
parents:
39314
diff
changeset
|
1555 |
|
40347
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1556 |
hide_const (open) part |
429bf4388b2f
added code lemmas for stable parametrized quicksort
haftmann
parents:
40346
diff
changeset
|
1557 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1558 |
lemma multiset_of_remdups_le: "multiset_of (remdups xs) \<le> multiset_of xs" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1559 |
by (induct xs) (auto intro: order_trans) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1560 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1561 |
lemma multiset_of_update: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1562 |
"i < length ls \<Longrightarrow> multiset_of (ls[i := v]) = multiset_of ls - {#ls ! i#} + {#v#}" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1563 |
proof (induct ls arbitrary: i) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1564 |
case Nil then show ?case by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1565 |
next |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1566 |
case (Cons x xs) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1567 |
show ?case |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1568 |
proof (cases i) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1569 |
case 0 then show ?thesis by simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1570 |
next |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1571 |
case (Suc i') |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1572 |
with Cons show ?thesis |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1573 |
apply simp |
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1574 |
apply (subst add.assoc) |
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1575 |
apply (subst add.commute [of "{#v#}" "{#x#}"]) |
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1576 |
apply (subst add.assoc [symmetric]) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1577 |
apply simp |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1578 |
apply (rule mset_le_multiset_union_diff_commute) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1579 |
apply (simp add: mset_le_single nth_mem_multiset_of) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1580 |
done |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1581 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1582 |
qed |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1583 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1584 |
lemma multiset_of_swap: |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1585 |
"i < length ls \<Longrightarrow> j < length ls \<Longrightarrow> |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1586 |
multiset_of (ls[j := ls ! i, i := ls ! j]) = multiset_of ls" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1587 |
by (cases "i = j") (simp_all add: multiset_of_update nth_mem_multiset_of) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1588 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1589 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
1590 |
subsection {* The multiset order *} |
10249 | 1591 |
|
1592 |
subsubsection {* Well-foundedness *} |
|
1593 |
||
28708
a1a436f09ec6
explicit check for pattern discipline before code translation
haftmann
parents:
28562
diff
changeset
|
1594 |
definition mult1 :: "('a \<times> 'a) set => ('a multiset \<times> 'a multiset) set" where |
37765 | 1595 |
"mult1 r = {(N, M). \<exists>a M0 K. M = M0 + {#a#} \<and> N = M0 + K \<and> |
23751 | 1596 |
(\<forall>b. b :# K --> (b, a) \<in> r)}" |
10249 | 1597 |
|
28708
a1a436f09ec6
explicit check for pattern discipline before code translation
haftmann
parents:
28562
diff
changeset
|
1598 |
definition mult :: "('a \<times> 'a) set => ('a multiset \<times> 'a multiset) set" where |
37765 | 1599 |
"mult r = (mult1 r)\<^sup>+" |
10249 | 1600 |
|
23751 | 1601 |
lemma not_less_empty [iff]: "(M, {#}) \<notin> mult1 r" |
26178 | 1602 |
by (simp add: mult1_def) |
10249 | 1603 |
|
23751 | 1604 |
lemma less_add: "(N, M0 + {#a#}) \<in> mult1 r ==> |
1605 |
(\<exists>M. (M, M0) \<in> mult1 r \<and> N = M + {#a#}) \<or> |
|
1606 |
(\<exists>K. (\<forall>b. b :# K --> (b, a) \<in> r) \<and> N = M0 + K)" |
|
19582 | 1607 |
(is "_ \<Longrightarrow> ?case1 (mult1 r) \<or> ?case2") |
10249 | 1608 |
proof (unfold mult1_def) |
23751 | 1609 |
let ?r = "\<lambda>K a. \<forall>b. b :# K --> (b, a) \<in> r" |
11464 | 1610 |
let ?R = "\<lambda>N M. \<exists>a M0 K. M = M0 + {#a#} \<and> N = M0 + K \<and> ?r K a" |
23751 | 1611 |
let ?case1 = "?case1 {(N, M). ?R N M}" |
10249 | 1612 |
|
23751 | 1613 |
assume "(N, M0 + {#a#}) \<in> {(N, M). ?R N M}" |
18258 | 1614 |
then have "\<exists>a' M0' K. |
11464 | 1615 |
M0 + {#a#} = M0' + {#a'#} \<and> N = M0' + K \<and> ?r K a'" by simp |
18258 | 1616 |
then show "?case1 \<or> ?case2" |
10249 | 1617 |
proof (elim exE conjE) |
1618 |
fix a' M0' K |
|
1619 |
assume N: "N = M0' + K" and r: "?r K a'" |
|
1620 |
assume "M0 + {#a#} = M0' + {#a'#}" |
|
18258 | 1621 |
then have "M0 = M0' \<and> a = a' \<or> |
11464 | 1622 |
(\<exists>K'. M0 = K' + {#a'#} \<and> M0' = K' + {#a#})" |
10249 | 1623 |
by (simp only: add_eq_conv_ex) |
18258 | 1624 |
then show ?thesis |
10249 | 1625 |
proof (elim disjE conjE exE) |
1626 |
assume "M0 = M0'" "a = a'" |
|
11464 | 1627 |
with N r have "?r K a \<and> N = M0 + K" by simp |
18258 | 1628 |
then have ?case2 .. then show ?thesis .. |
10249 | 1629 |
next |
1630 |
fix K' |
|
1631 |
assume "M0' = K' + {#a#}" |
|
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1632 |
with N have n: "N = K' + K + {#a#}" by (simp add: ac_simps) |
10249 | 1633 |
|
1634 |
assume "M0 = K' + {#a'#}" |
|
1635 |
with r have "?R (K' + K) M0" by blast |
|
18258 | 1636 |
with n have ?case1 by simp then show ?thesis .. |
10249 | 1637 |
qed |
1638 |
qed |
|
1639 |
qed |
|
1640 |
||
54295 | 1641 |
lemma all_accessible: "wf r ==> \<forall>M. M \<in> Wellfounded.acc (mult1 r)" |
10249 | 1642 |
proof |
1643 |
let ?R = "mult1 r" |
|
54295 | 1644 |
let ?W = "Wellfounded.acc ?R" |
10249 | 1645 |
{ |
1646 |
fix M M0 a |
|
23751 | 1647 |
assume M0: "M0 \<in> ?W" |
1648 |
and wf_hyp: "!!b. (b, a) \<in> r ==> (\<forall>M \<in> ?W. M + {#b#} \<in> ?W)" |
|
1649 |
and acc_hyp: "\<forall>M. (M, M0) \<in> ?R --> M + {#a#} \<in> ?W" |
|
1650 |
have "M0 + {#a#} \<in> ?W" |
|
1651 |
proof (rule accI [of "M0 + {#a#}"]) |
|
10249 | 1652 |
fix N |
23751 | 1653 |
assume "(N, M0 + {#a#}) \<in> ?R" |
1654 |
then have "((\<exists>M. (M, M0) \<in> ?R \<and> N = M + {#a#}) \<or> |
|
1655 |
(\<exists>K. (\<forall>b. b :# K --> (b, a) \<in> r) \<and> N = M0 + K))" |
|
10249 | 1656 |
by (rule less_add) |
23751 | 1657 |
then show "N \<in> ?W" |
10249 | 1658 |
proof (elim exE disjE conjE) |
23751 | 1659 |
fix M assume "(M, M0) \<in> ?R" and N: "N = M + {#a#}" |
1660 |
from acc_hyp have "(M, M0) \<in> ?R --> M + {#a#} \<in> ?W" .. |
|
1661 |
from this and `(M, M0) \<in> ?R` have "M + {#a#} \<in> ?W" .. |
|
1662 |
then show "N \<in> ?W" by (simp only: N) |
|
10249 | 1663 |
next |
1664 |
fix K |
|
1665 |
assume N: "N = M0 + K" |
|
23751 | 1666 |
assume "\<forall>b. b :# K --> (b, a) \<in> r" |
1667 |
then have "M0 + K \<in> ?W" |
|
10249 | 1668 |
proof (induct K) |
18730 | 1669 |
case empty |
23751 | 1670 |
from M0 show "M0 + {#} \<in> ?W" by simp |
18730 | 1671 |
next |
1672 |
case (add K x) |
|
23751 | 1673 |
from add.prems have "(x, a) \<in> r" by simp |
1674 |
with wf_hyp have "\<forall>M \<in> ?W. M + {#x#} \<in> ?W" by blast |
|
1675 |
moreover from add have "M0 + K \<in> ?W" by simp |
|
1676 |
ultimately have "(M0 + K) + {#x#} \<in> ?W" .. |
|
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1677 |
then show "M0 + (K + {#x#}) \<in> ?W" by (simp only: add.assoc) |
10249 | 1678 |
qed |
23751 | 1679 |
then show "N \<in> ?W" by (simp only: N) |
10249 | 1680 |
qed |
1681 |
qed |
|
1682 |
} note tedious_reasoning = this |
|
1683 |
||
23751 | 1684 |
assume wf: "wf r" |
10249 | 1685 |
fix M |
23751 | 1686 |
show "M \<in> ?W" |
10249 | 1687 |
proof (induct M) |
23751 | 1688 |
show "{#} \<in> ?W" |
10249 | 1689 |
proof (rule accI) |
23751 | 1690 |
fix b assume "(b, {#}) \<in> ?R" |
1691 |
with not_less_empty show "b \<in> ?W" by contradiction |
|
10249 | 1692 |
qed |
1693 |
||
23751 | 1694 |
fix M a assume "M \<in> ?W" |
1695 |
from wf have "\<forall>M \<in> ?W. M + {#a#} \<in> ?W" |
|
10249 | 1696 |
proof induct |
1697 |
fix a |
|
23751 | 1698 |
assume r: "!!b. (b, a) \<in> r ==> (\<forall>M \<in> ?W. M + {#b#} \<in> ?W)" |
1699 |
show "\<forall>M \<in> ?W. M + {#a#} \<in> ?W" |
|
10249 | 1700 |
proof |
23751 | 1701 |
fix M assume "M \<in> ?W" |
1702 |
then show "M + {#a#} \<in> ?W" |
|
23373 | 1703 |
by (rule acc_induct) (rule tedious_reasoning [OF _ r]) |
10249 | 1704 |
qed |
1705 |
qed |
|
23751 | 1706 |
from this and `M \<in> ?W` show "M + {#a#} \<in> ?W" .. |
10249 | 1707 |
qed |
1708 |
qed |
|
1709 |
||
23751 | 1710 |
theorem wf_mult1: "wf r ==> wf (mult1 r)" |
26178 | 1711 |
by (rule acc_wfI) (rule all_accessible) |
10249 | 1712 |
|
23751 | 1713 |
theorem wf_mult: "wf r ==> wf (mult r)" |
26178 | 1714 |
unfolding mult_def by (rule wf_trancl) (rule wf_mult1) |
10249 | 1715 |
|
1716 |
||
1717 |
subsubsection {* Closure-free presentation *} |
|
1718 |
||
1719 |
text {* One direction. *} |
|
1720 |
||
1721 |
lemma mult_implies_one_step: |
|
23751 | 1722 |
"trans r ==> (M, N) \<in> mult r ==> |
11464 | 1723 |
\<exists>I J K. N = I + J \<and> M = I + K \<and> J \<noteq> {#} \<and> |
23751 | 1724 |
(\<forall>k \<in> set_of K. \<exists>j \<in> set_of J. (k, j) \<in> r)" |
26178 | 1725 |
apply (unfold mult_def mult1_def set_of_def) |
1726 |
apply (erule converse_trancl_induct, clarify) |
|
1727 |
apply (rule_tac x = M0 in exI, simp, clarify) |
|
1728 |
apply (case_tac "a :# K") |
|
1729 |
apply (rule_tac x = I in exI) |
|
1730 |
apply (simp (no_asm)) |
|
1731 |
apply (rule_tac x = "(K - {#a#}) + Ka" in exI) |
|
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1732 |
apply (simp (no_asm_simp) add: add.assoc [symmetric]) |
59807 | 1733 |
apply (drule_tac f = "\<lambda>M. M - {#a#}" and x="S + T" for S T in arg_cong) |
26178 | 1734 |
apply (simp add: diff_union_single_conv) |
1735 |
apply (simp (no_asm_use) add: trans_def) |
|
1736 |
apply blast |
|
1737 |
apply (subgoal_tac "a :# I") |
|
1738 |
apply (rule_tac x = "I - {#a#}" in exI) |
|
1739 |
apply (rule_tac x = "J + {#a#}" in exI) |
|
1740 |
apply (rule_tac x = "K + Ka" in exI) |
|
1741 |
apply (rule conjI) |
|
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
1742 |
apply (simp add: multiset_eq_iff split: nat_diff_split) |
26178 | 1743 |
apply (rule conjI) |
59807 | 1744 |
apply (drule_tac f = "\<lambda>M. M - {#a#}" and x="S + T" for S T in arg_cong, simp) |
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
1745 |
apply (simp add: multiset_eq_iff split: nat_diff_split) |
26178 | 1746 |
apply (simp (no_asm_use) add: trans_def) |
1747 |
apply blast |
|
1748 |
apply (subgoal_tac "a :# (M0 + {#a#})") |
|
1749 |
apply simp |
|
1750 |
apply (simp (no_asm)) |
|
1751 |
done |
|
10249 | 1752 |
|
1753 |
lemma one_step_implies_mult_aux: |
|
23751 | 1754 |
"trans r ==> |
1755 |
\<forall>I J K. (size J = n \<and> J \<noteq> {#} \<and> (\<forall>k \<in> set_of K. \<exists>j \<in> set_of J. (k, j) \<in> r)) |
|
1756 |
--> (I + K, I + J) \<in> mult r" |
|
26178 | 1757 |
apply (induct_tac n, auto) |
1758 |
apply (frule size_eq_Suc_imp_eq_union, clarify) |
|
1759 |
apply (rename_tac "J'", simp) |
|
1760 |
apply (erule notE, auto) |
|
1761 |
apply (case_tac "J' = {#}") |
|
1762 |
apply (simp add: mult_def) |
|
1763 |
apply (rule r_into_trancl) |
|
1764 |
apply (simp add: mult1_def set_of_def, blast) |
|
1765 |
txt {* Now we know @{term "J' \<noteq> {#}"}. *} |
|
1766 |
apply (cut_tac M = K and P = "\<lambda>x. (x, a) \<in> r" in multiset_partition) |
|
59807 | 1767 |
apply (erule_tac P = "\<forall>k \<in> set_of K. P k" for P in rev_mp) |
26178 | 1768 |
apply (erule ssubst) |
1769 |
apply (simp add: Ball_def, auto) |
|
1770 |
apply (subgoal_tac |
|
1771 |
"((I + {# x :# K. (x, a) \<in> r #}) + {# x :# K. (x, a) \<notin> r #}, |
|
1772 |
(I + {# x :# K. (x, a) \<in> r #}) + J') \<in> mult r") |
|
1773 |
prefer 2 |
|
1774 |
apply force |
|
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1775 |
apply (simp (no_asm_use) add: add.assoc [symmetric] mult_def) |
26178 | 1776 |
apply (erule trancl_trans) |
1777 |
apply (rule r_into_trancl) |
|
1778 |
apply (simp add: mult1_def set_of_def) |
|
1779 |
apply (rule_tac x = a in exI) |
|
1780 |
apply (rule_tac x = "I + J'" in exI) |
|
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1781 |
apply (simp add: ac_simps) |
26178 | 1782 |
done |
10249 | 1783 |
|
17161 | 1784 |
lemma one_step_implies_mult: |
23751 | 1785 |
"trans r ==> J \<noteq> {#} ==> \<forall>k \<in> set_of K. \<exists>j \<in> set_of J. (k, j) \<in> r |
1786 |
==> (I + K, I + J) \<in> mult r" |
|
26178 | 1787 |
using one_step_implies_mult_aux by blast |
10249 | 1788 |
|
1789 |
||
1790 |
subsubsection {* Partial-order properties *} |
|
1791 |
||
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1792 |
definition less_multiset :: "'a\<Colon>order multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "#<#" 50) where |
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1793 |
"M' #<# M \<longleftrightarrow> (M', M) \<in> mult {(x', x). x' < x}" |
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1794 |
|
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1795 |
definition le_multiset :: "'a\<Colon>order multiset \<Rightarrow> 'a multiset \<Rightarrow> bool" (infix "#<=#" 50) where |
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1796 |
"M' #<=# M \<longleftrightarrow> M' #<# M \<or> M' = M" |
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1797 |
|
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1798 |
notation (xsymbols) less_multiset (infix "#\<subset>#" 50) |
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1799 |
notation (xsymbols) le_multiset (infix "#\<subseteq>#" 50) |
10249 | 1800 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1801 |
interpretation multiset_order: order le_multiset less_multiset |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1802 |
proof - |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1803 |
have irrefl: "\<And>M :: 'a multiset. \<not> M #\<subset># M" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1804 |
proof |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1805 |
fix M :: "'a multiset" |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1806 |
assume "M #\<subset># M" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1807 |
then have MM: "(M, M) \<in> mult {(x, y). x < y}" by (simp add: less_multiset_def) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1808 |
have "trans {(x'::'a, x). x' < x}" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1809 |
by (rule transI) simp |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1810 |
moreover note MM |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1811 |
ultimately have "\<exists>I J K. M = I + J \<and> M = I + K |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1812 |
\<and> J \<noteq> {#} \<and> (\<forall>k\<in>set_of K. \<exists>j\<in>set_of J. (k, j) \<in> {(x, y). x < y})" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1813 |
by (rule mult_implies_one_step) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1814 |
then obtain I J K where "M = I + J" and "M = I + K" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1815 |
and "J \<noteq> {#}" and "(\<forall>k\<in>set_of K. \<exists>j\<in>set_of J. (k, j) \<in> {(x, y). x < y})" by blast |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1816 |
then have aux1: "K \<noteq> {#}" and aux2: "\<forall>k\<in>set_of K. \<exists>j\<in>set_of K. k < j" by auto |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1817 |
have "finite (set_of K)" by simp |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1818 |
moreover note aux2 |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1819 |
ultimately have "set_of K = {}" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1820 |
by (induct rule: finite_induct) (auto intro: order_less_trans) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1821 |
with aux1 show False by simp |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1822 |
qed |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1823 |
have trans: "\<And>K M N :: 'a multiset. K #\<subset># M \<Longrightarrow> M #\<subset># N \<Longrightarrow> K #\<subset># N" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1824 |
unfolding less_multiset_def mult_def by (blast intro: trancl_trans) |
46921 | 1825 |
show "class.order (le_multiset :: 'a multiset \<Rightarrow> _) less_multiset" |
1826 |
by default (auto simp add: le_multiset_def irrefl dest: trans) |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1827 |
qed |
10249 | 1828 |
|
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1829 |
lemma mult_less_irrefl [elim!]: "M #\<subset># (M::'a::order multiset) ==> R" |
46730 | 1830 |
by simp |
26567
7bcebb8c2d33
instantiation replacing primitive instance plus overloaded defs; more conservative type arities
haftmann
parents:
26178
diff
changeset
|
1831 |
|
10249 | 1832 |
|
1833 |
subsubsection {* Monotonicity of multiset union *} |
|
1834 |
||
46730 | 1835 |
lemma mult1_union: "(B, D) \<in> mult1 r ==> (C + B, C + D) \<in> mult1 r" |
26178 | 1836 |
apply (unfold mult1_def) |
1837 |
apply auto |
|
1838 |
apply (rule_tac x = a in exI) |
|
1839 |
apply (rule_tac x = "C + M0" in exI) |
|
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1840 |
apply (simp add: add.assoc) |
26178 | 1841 |
done |
10249 | 1842 |
|
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1843 |
lemma union_less_mono2: "B #\<subset># D ==> C + B #\<subset># C + (D::'a::order multiset)" |
26178 | 1844 |
apply (unfold less_multiset_def mult_def) |
1845 |
apply (erule trancl_induct) |
|
40249
cd404ecb9107
Remove unnecessary premise of mult1_union
Lars Noschinski <noschinl@in.tum.de>
parents:
39533
diff
changeset
|
1846 |
apply (blast intro: mult1_union) |
cd404ecb9107
Remove unnecessary premise of mult1_union
Lars Noschinski <noschinl@in.tum.de>
parents:
39533
diff
changeset
|
1847 |
apply (blast intro: mult1_union trancl_trans) |
26178 | 1848 |
done |
10249 | 1849 |
|
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1850 |
lemma union_less_mono1: "B #\<subset># D ==> B + C #\<subset># D + (C::'a::order multiset)" |
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1851 |
apply (subst add.commute [of B C]) |
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
1852 |
apply (subst add.commute [of D C]) |
26178 | 1853 |
apply (erule union_less_mono2) |
1854 |
done |
|
10249 | 1855 |
|
17161 | 1856 |
lemma union_less_mono: |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
1857 |
"A #\<subset># C ==> B #\<subset># D ==> A + B #\<subset># C + (D::'a::order multiset)" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1858 |
by (blast intro!: union_less_mono1 union_less_mono2 multiset_order.less_trans) |
10249 | 1859 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1860 |
interpretation multiset_order: ordered_ab_semigroup_add plus le_multiset less_multiset |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1861 |
proof |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
1862 |
qed (auto simp add: le_multiset_def intro: union_less_mono2) |
26145 | 1863 |
|
15072 | 1864 |
|
59813 | 1865 |
subsubsection {* Termination proofs with multiset orders *} |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1866 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1867 |
lemma multi_member_skip: "x \<in># XS \<Longrightarrow> x \<in># {# y #} + XS" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1868 |
and multi_member_this: "x \<in># {# x #} + XS" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1869 |
and multi_member_last: "x \<in># {# x #}" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1870 |
by auto |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1871 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1872 |
definition "ms_strict = mult pair_less" |
37765 | 1873 |
definition "ms_weak = ms_strict \<union> Id" |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1874 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1875 |
lemma ms_reduction_pair: "reduction_pair (ms_strict, ms_weak)" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1876 |
unfolding reduction_pair_def ms_strict_def ms_weak_def pair_less_def |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1877 |
by (auto intro: wf_mult1 wf_trancl simp: mult_def) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1878 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1879 |
lemma smsI: |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1880 |
"(set_of A, set_of B) \<in> max_strict \<Longrightarrow> (Z + A, Z + B) \<in> ms_strict" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1881 |
unfolding ms_strict_def |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1882 |
by (rule one_step_implies_mult) (auto simp add: max_strict_def pair_less_def elim!:max_ext.cases) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1883 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1884 |
lemma wmsI: |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1885 |
"(set_of A, set_of B) \<in> max_strict \<or> A = {#} \<and> B = {#} |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1886 |
\<Longrightarrow> (Z + A, Z + B) \<in> ms_weak" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1887 |
unfolding ms_weak_def ms_strict_def |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1888 |
by (auto simp add: pair_less_def max_strict_def elim!:max_ext.cases intro: one_step_implies_mult) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1889 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1890 |
inductive pw_leq |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1891 |
where |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1892 |
pw_leq_empty: "pw_leq {#} {#}" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1893 |
| pw_leq_step: "\<lbrakk>(x,y) \<in> pair_leq; pw_leq X Y \<rbrakk> \<Longrightarrow> pw_leq ({#x#} + X) ({#y#} + Y)" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1894 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1895 |
lemma pw_leq_lstep: |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1896 |
"(x, y) \<in> pair_leq \<Longrightarrow> pw_leq {#x#} {#y#}" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1897 |
by (drule pw_leq_step) (rule pw_leq_empty, simp) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1898 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1899 |
lemma pw_leq_split: |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1900 |
assumes "pw_leq X Y" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1901 |
shows "\<exists>A B Z. X = A + Z \<and> Y = B + Z \<and> ((set_of A, set_of B) \<in> max_strict \<or> (B = {#} \<and> A = {#}))" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1902 |
using assms |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1903 |
proof (induct) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1904 |
case pw_leq_empty thus ?case by auto |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1905 |
next |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1906 |
case (pw_leq_step x y X Y) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1907 |
then obtain A B Z where |
58425 | 1908 |
[simp]: "X = A + Z" "Y = B + Z" |
1909 |
and 1[simp]: "(set_of A, set_of B) \<in> max_strict \<or> (B = {#} \<and> A = {#})" |
|
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1910 |
by auto |
58425 | 1911 |
from pw_leq_step have "x = y \<or> (x, y) \<in> pair_less" |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1912 |
unfolding pair_leq_def by auto |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1913 |
thus ?case |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1914 |
proof |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1915 |
assume [simp]: "x = y" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1916 |
have |
58425 | 1917 |
"{#x#} + X = A + ({#y#}+Z) |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1918 |
\<and> {#y#} + Y = B + ({#y#}+Z) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1919 |
\<and> ((set_of A, set_of B) \<in> max_strict \<or> (B = {#} \<and> A = {#}))" |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1920 |
by (auto simp: ac_simps) |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1921 |
thus ?case by (intro exI) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1922 |
next |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1923 |
assume A: "(x, y) \<in> pair_less" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1924 |
let ?A' = "{#x#} + A" and ?B' = "{#y#} + B" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1925 |
have "{#x#} + X = ?A' + Z" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1926 |
"{#y#} + Y = ?B' + Z" |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1927 |
by (auto simp add: ac_simps) |
58425 | 1928 |
moreover have |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1929 |
"(set_of ?A', set_of ?B') \<in> max_strict" |
58425 | 1930 |
using 1 A unfolding max_strict_def |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1931 |
by (auto elim!: max_ext.cases) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1932 |
ultimately show ?thesis by blast |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1933 |
qed |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1934 |
qed |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1935 |
|
58425 | 1936 |
lemma |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1937 |
assumes pwleq: "pw_leq Z Z'" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1938 |
shows ms_strictI: "(set_of A, set_of B) \<in> max_strict \<Longrightarrow> (Z + A, Z' + B) \<in> ms_strict" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1939 |
and ms_weakI1: "(set_of A, set_of B) \<in> max_strict \<Longrightarrow> (Z + A, Z' + B) \<in> ms_weak" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1940 |
and ms_weakI2: "(Z + {#}, Z' + {#}) \<in> ms_weak" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1941 |
proof - |
58425 | 1942 |
from pw_leq_split[OF pwleq] |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1943 |
obtain A' B' Z'' |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1944 |
where [simp]: "Z = A' + Z''" "Z' = B' + Z''" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1945 |
and mx_or_empty: "(set_of A', set_of B') \<in> max_strict \<or> (A' = {#} \<and> B' = {#})" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1946 |
by blast |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1947 |
{ |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1948 |
assume max: "(set_of A, set_of B) \<in> max_strict" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1949 |
from mx_or_empty |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1950 |
have "(Z'' + (A + A'), Z'' + (B + B')) \<in> ms_strict" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1951 |
proof |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1952 |
assume max': "(set_of A', set_of B') \<in> max_strict" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1953 |
with max have "(set_of (A + A'), set_of (B + B')) \<in> max_strict" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1954 |
by (auto simp: max_strict_def intro: max_ext_additive) |
58425 | 1955 |
thus ?thesis by (rule smsI) |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1956 |
next |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1957 |
assume [simp]: "A' = {#} \<and> B' = {#}" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1958 |
show ?thesis by (rule smsI) (auto intro: max) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1959 |
qed |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1960 |
thus "(Z + A, Z' + B) \<in> ms_strict" by (simp add:ac_simps) |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1961 |
thus "(Z + A, Z' + B) \<in> ms_weak" by (simp add: ms_weak_def) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1962 |
} |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1963 |
from mx_or_empty |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1964 |
have "(Z'' + A', Z'' + B') \<in> ms_weak" by (rule wmsI) |
57514
bdc2c6b40bf2
prefer ac_simps collections over separate name bindings for add and mult
haftmann
parents:
57512
diff
changeset
|
1965 |
thus "(Z + {#}, Z' + {#}) \<in> ms_weak" by (simp add:ac_simps) |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1966 |
qed |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1967 |
|
39301 | 1968 |
lemma empty_neutral: "{#} + x = x" "x + {#} = x" |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1969 |
and nonempty_plus: "{# x #} + rs \<noteq> {#}" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1970 |
and nonempty_single: "{# x #} \<noteq> {#}" |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1971 |
by auto |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1972 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1973 |
setup {* |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1974 |
let |
35402 | 1975 |
fun msetT T = Type (@{type_name multiset}, [T]); |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1976 |
|
35402 | 1977 |
fun mk_mset T [] = Const (@{const_abbrev Mempty}, msetT T) |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1978 |
| mk_mset T [x] = Const (@{const_name single}, T --> msetT T) $ x |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1979 |
| mk_mset T (x :: xs) = |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1980 |
Const (@{const_name plus}, msetT T --> msetT T --> msetT T) $ |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1981 |
mk_mset T [x] $ mk_mset T xs |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1982 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1983 |
fun mset_member_tac m i = |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1984 |
(if m <= 0 then |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1985 |
rtac @{thm multi_member_this} i ORELSE rtac @{thm multi_member_last} i |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1986 |
else |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1987 |
rtac @{thm multi_member_skip} i THEN mset_member_tac (m - 1) i) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1988 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1989 |
val mset_nonempty_tac = |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1990 |
rtac @{thm nonempty_plus} ORELSE' rtac @{thm nonempty_single} |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1991 |
|
59625 | 1992 |
fun regroup_munion_conv ctxt = |
1993 |
Function_Lib.regroup_conv ctxt @{const_abbrev Mempty} @{const_name plus} |
|
1994 |
(map (fn t => t RS eq_reflection) (@{thms ac_simps} @ @{thms empty_neutral})) |
|
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
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diff
changeset
|
1995 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1996 |
fun unfold_pwleq_tac i = |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1997 |
(rtac @{thm pw_leq_step} i THEN (fn st => unfold_pwleq_tac (i + 1) st)) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1998 |
ORELSE (rtac @{thm pw_leq_lstep} i) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
1999 |
ORELSE (rtac @{thm pw_leq_empty} i) |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2000 |
|
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2001 |
val set_of_simps = [@{thm set_of_empty}, @{thm set_of_single}, @{thm set_of_union}, |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2002 |
@{thm Un_insert_left}, @{thm Un_empty_left}] |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2003 |
in |
58425 | 2004 |
ScnpReconstruct.multiset_setup (ScnpReconstruct.Multiset |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2005 |
{ |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2006 |
msetT=msetT, mk_mset=mk_mset, mset_regroup_conv=regroup_munion_conv, |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2007 |
mset_member_tac=mset_member_tac, mset_nonempty_tac=mset_nonempty_tac, |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2008 |
mset_pwleq_tac=unfold_pwleq_tac, set_of_simps=set_of_simps, |
30595
c87a3350f5a9
proper spacing before ML antiquotations -- note that @ may be part of symbolic ML identifiers;
wenzelm
parents:
30428
diff
changeset
|
2009 |
smsI'= @{thm ms_strictI}, wmsI2''= @{thm ms_weakI2}, wmsI1= @{thm ms_weakI1}, |
c87a3350f5a9
proper spacing before ML antiquotations -- note that @ may be part of symbolic ML identifiers;
wenzelm
parents:
30428
diff
changeset
|
2010 |
reduction_pair= @{thm ms_reduction_pair} |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2011 |
}) |
10249 | 2012 |
end |
29125
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2013 |
*} |
d41182a8135c
method "sizechange" proves termination of functions; added more infrastructure for termination proofs
krauss
parents:
28823
diff
changeset
|
2014 |
|
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2015 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2016 |
subsection {* Legacy theorem bindings *} |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2017 |
|
39302
d7728f65b353
renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents:
39301
diff
changeset
|
2018 |
lemmas multi_count_eq = multiset_eq_iff [symmetric] |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2019 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2020 |
lemma union_commute: "M + N = N + (M::'a multiset)" |
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
2021 |
by (fact add.commute) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2022 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2023 |
lemma union_assoc: "(M + N) + K = M + (N + (K::'a multiset))" |
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
2024 |
by (fact add.assoc) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2025 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2026 |
lemma union_lcomm: "M + (N + K) = N + (M + (K::'a multiset))" |
57512
cc97b347b301
reduced name variants for assoc and commute on plus and mult
haftmann
parents:
57492
diff
changeset
|
2027 |
by (fact add.left_commute) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2028 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2029 |
lemmas union_ac = union_assoc union_commute union_lcomm |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2030 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2031 |
lemma union_right_cancel: "M + K = N + K \<longleftrightarrow> M = (N::'a multiset)" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2032 |
by (fact add_right_cancel) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2033 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2034 |
lemma union_left_cancel: "K + M = K + N \<longleftrightarrow> M = (N::'a multiset)" |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2035 |
by (fact add_left_cancel) |
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2036 |
|
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2037 |
lemma multi_union_self_other_eq: "(A::'a multiset) + X = A + Y \<Longrightarrow> X = Y" |
59557 | 2038 |
by (fact add_left_imp_eq) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2039 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2040 |
lemma mset_less_trans: "(M::'a multiset) < K \<Longrightarrow> K < N \<Longrightarrow> M < N" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2041 |
by (fact order_less_trans) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2042 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2043 |
lemma multiset_inter_commute: "A #\<inter> B = B #\<inter> A" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2044 |
by (fact inf.commute) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2045 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2046 |
lemma multiset_inter_assoc: "A #\<inter> (B #\<inter> C) = A #\<inter> B #\<inter> C" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2047 |
by (fact inf.assoc [symmetric]) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2048 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2049 |
lemma multiset_inter_left_commute: "A #\<inter> (B #\<inter> C) = B #\<inter> (A #\<inter> C)" |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2050 |
by (fact inf.left_commute) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2051 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2052 |
lemmas multiset_inter_ac = |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2053 |
multiset_inter_commute |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2054 |
multiset_inter_assoc |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2055 |
multiset_inter_left_commute |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2056 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2057 |
lemma mult_less_not_refl: |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
2058 |
"\<not> M #\<subset># (M::'a::order multiset)" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2059 |
by (fact multiset_order.less_irrefl) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2060 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2061 |
lemma mult_less_trans: |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
2062 |
"K #\<subset># M ==> M #\<subset># N ==> K #\<subset># (N::'a::order multiset)" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2063 |
by (fact multiset_order.less_trans) |
58425 | 2064 |
|
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2065 |
lemma mult_less_not_sym: |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
2066 |
"M #\<subset># N ==> \<not> N #\<subset># (M::'a::order multiset)" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2067 |
by (fact multiset_order.less_not_sym) |
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2068 |
|
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2069 |
lemma mult_less_asym: |
59958
4538d41e8e54
renamed multiset ordering to free up nice <# etc. symbols for the standard subset
blanchet
parents:
59949
diff
changeset
|
2070 |
"M #\<subset># N ==> (\<not> P ==> N #\<subset># (M::'a::order multiset)) ==> P" |
35268
04673275441a
switched notations for pointwise and multiset order
haftmann
parents:
35028
diff
changeset
|
2071 |
by (fact multiset_order.less_asym) |
34943
e97b22500a5c
cleanup of Multiset.thy: less duplication, tuned and simplified a couple of proofs, less historical organization of sections, conversion from associations lists to multisets, rudimentary code generation
haftmann
parents:
33102
diff
changeset
|
2072 |
|
35712
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2073 |
ML {* |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2074 |
fun multiset_postproc _ maybe_name all_values (T as Type (_, [elem_T])) |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2075 |
(Const _ $ t') = |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2076 |
let |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2077 |
val (maybe_opt, ps) = |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2078 |
Nitpick_Model.dest_plain_fun t' ||> op ~~ |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2079 |
||> map (apsnd (snd o HOLogic.dest_number)) |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2080 |
fun elems_for t = |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2081 |
case AList.lookup (op =) ps t of |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2082 |
SOME n => replicate n t |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2083 |
| NONE => [Const (maybe_name, elem_T --> elem_T) $ t] |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2084 |
in |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2085 |
case maps elems_for (all_values elem_T) @ |
37261 | 2086 |
(if maybe_opt then [Const (Nitpick_Model.unrep (), elem_T)] |
2087 |
else []) of |
|
35712
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2088 |
[] => Const (@{const_name zero_class.zero}, T) |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2089 |
| ts => foldl1 (fn (t1, t2) => |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2090 |
Const (@{const_name plus_class.plus}, T --> T --> T) |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2091 |
$ t1 $ t2) |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2092 |
(map (curry (op $) (Const (@{const_name single}, |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2093 |
elem_T --> T))) ts) |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2094 |
end |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2095 |
| multiset_postproc _ _ _ _ t = t |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2096 |
*} |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2097 |
|
38287 | 2098 |
declaration {* |
2099 |
Nitpick_Model.register_term_postprocessor @{typ "'a multiset"} |
|
38242 | 2100 |
multiset_postproc |
35712
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2101 |
*} |
77aa29bf14ee
added a mechanism to Nitpick to support custom rendering of terms, and used it for multisets
blanchet
parents:
35402
diff
changeset
|
2102 |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2103 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2104 |
subsection {* Naive implementation using lists *} |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2105 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2106 |
code_datatype multiset_of |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2107 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2108 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2109 |
"{#} = multiset_of []" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2110 |
by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2111 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2112 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2113 |
"{#x#} = multiset_of [x]" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2114 |
by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2115 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2116 |
lemma union_code [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2117 |
"multiset_of xs + multiset_of ys = multiset_of (xs @ ys)" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2118 |
by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2119 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2120 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2121 |
"image_mset f (multiset_of xs) = multiset_of (map f xs)" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2122 |
by (simp add: multiset_of_map) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2123 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2124 |
lemma [code]: |
59998
c54d36be22ef
renamed Multiset.fold -> fold_mset, Multiset.filter -> filter_mset
nipkow
parents:
59986
diff
changeset
|
2125 |
"filter_mset f (multiset_of xs) = multiset_of (filter f xs)" |
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2126 |
by (simp add: multiset_of_filter) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2127 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2128 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2129 |
"multiset_of xs - multiset_of ys = multiset_of (fold remove1 ys xs)" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2130 |
by (rule sym, induct ys arbitrary: xs) (simp_all add: diff_add diff_right_commute) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2131 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2132 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2133 |
"multiset_of xs #\<inter> multiset_of ys = |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2134 |
multiset_of (snd (fold (\<lambda>x (ys, zs). |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2135 |
if x \<in> set ys then (remove1 x ys, x # zs) else (ys, zs)) xs (ys, [])))" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2136 |
proof - |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2137 |
have "\<And>zs. multiset_of (snd (fold (\<lambda>x (ys, zs). |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2138 |
if x \<in> set ys then (remove1 x ys, x # zs) else (ys, zs)) xs (ys, zs))) = |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2139 |
(multiset_of xs #\<inter> multiset_of ys) + multiset_of zs" |
51623 | 2140 |
by (induct xs arbitrary: ys) |
2141 |
(auto simp add: mem_set_multiset_eq inter_add_right1 inter_add_right2 ac_simps) |
|
2142 |
then show ?thesis by simp |
|
2143 |
qed |
|
2144 |
||
2145 |
lemma [code]: |
|
2146 |
"multiset_of xs #\<union> multiset_of ys = |
|
2147 |
multiset_of (split append (fold (\<lambda>x (ys, zs). (remove1 x ys, x # zs)) xs (ys, [])))" |
|
2148 |
proof - |
|
2149 |
have "\<And>zs. multiset_of (split append (fold (\<lambda>x (ys, zs). (remove1 x ys, x # zs)) xs (ys, zs))) = |
|
2150 |
(multiset_of xs #\<union> multiset_of ys) + multiset_of zs" |
|
2151 |
by (induct xs arbitrary: ys) (simp_all add: multiset_eq_iff) |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2152 |
then show ?thesis by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2153 |
qed |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2154 |
|
59813 | 2155 |
declare in_multiset_in_set [code_unfold] |
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2156 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2157 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2158 |
"count (multiset_of xs) x = fold (\<lambda>y. if x = y then Suc else id) xs 0" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2159 |
proof - |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2160 |
have "\<And>n. fold (\<lambda>y. if x = y then Suc else id) xs n = count (multiset_of xs) x + n" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2161 |
by (induct xs) simp_all |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2162 |
then show ?thesis by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2163 |
qed |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2164 |
|
59813 | 2165 |
declare set_of_multiset_of [code] |
2166 |
||
2167 |
declare sorted_list_of_multiset_multiset_of [code] |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2168 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2169 |
lemma [code]: -- {* not very efficient, but representation-ignorant! *} |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2170 |
"multiset_of_set A = multiset_of (sorted_list_of_set A)" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2171 |
apply (cases "finite A") |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2172 |
apply simp_all |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2173 |
apply (induct A rule: finite_induct) |
59813 | 2174 |
apply (simp_all add: add.commute) |
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2175 |
done |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2176 |
|
59949 | 2177 |
declare size_multiset_of [code] |
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2178 |
|
58425 | 2179 |
fun ms_lesseq_impl :: "'a list \<Rightarrow> 'a list \<Rightarrow> bool option" where |
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2180 |
"ms_lesseq_impl [] ys = Some (ys \<noteq> [])" |
58425 | 2181 |
| "ms_lesseq_impl (Cons x xs) ys = (case List.extract (op = x) ys of |
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2182 |
None \<Rightarrow> None |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2183 |
| Some (ys1,_,ys2) \<Rightarrow> ms_lesseq_impl xs (ys1 @ ys2))" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2184 |
|
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2185 |
lemma ms_lesseq_impl: "(ms_lesseq_impl xs ys = None \<longleftrightarrow> \<not> multiset_of xs \<le> multiset_of ys) \<and> |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2186 |
(ms_lesseq_impl xs ys = Some True \<longleftrightarrow> multiset_of xs < multiset_of ys) \<and> |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2187 |
(ms_lesseq_impl xs ys = Some False \<longrightarrow> multiset_of xs = multiset_of ys)" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2188 |
proof (induct xs arbitrary: ys) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2189 |
case (Nil ys) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2190 |
show ?case by (auto simp: mset_less_empty_nonempty) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2191 |
next |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2192 |
case (Cons x xs ys) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2193 |
show ?case |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2194 |
proof (cases "List.extract (op = x) ys") |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2195 |
case None |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2196 |
hence x: "x \<notin> set ys" by (simp add: extract_None_iff) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2197 |
{ |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2198 |
assume "multiset_of (x # xs) \<le> multiset_of ys" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2199 |
from set_of_mono[OF this] x have False by simp |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2200 |
} note nle = this |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2201 |
moreover |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2202 |
{ |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2203 |
assume "multiset_of (x # xs) < multiset_of ys" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2204 |
hence "multiset_of (x # xs) \<le> multiset_of ys" by auto |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2205 |
from nle[OF this] have False . |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2206 |
} |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2207 |
ultimately show ?thesis using None by auto |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2208 |
next |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2209 |
case (Some res) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2210 |
obtain ys1 y ys2 where res: "res = (ys1,y,ys2)" by (cases res, auto) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2211 |
note Some = Some[unfolded res] |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2212 |
from extract_SomeE[OF Some] have "ys = ys1 @ x # ys2" by simp |
58425 | 2213 |
hence id: "multiset_of ys = multiset_of (ys1 @ ys2) + {#x#}" |
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2214 |
by (auto simp: ac_simps) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2215 |
show ?thesis unfolding ms_lesseq_impl.simps |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2216 |
unfolding Some option.simps split |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2217 |
unfolding id |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2218 |
using Cons[of "ys1 @ ys2"] |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2219 |
unfolding mset_le_def mset_less_def by auto |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2220 |
qed |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2221 |
qed |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2222 |
|
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2223 |
lemma [code]: "multiset_of xs \<le> multiset_of ys \<longleftrightarrow> ms_lesseq_impl xs ys \<noteq> None" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2224 |
using ms_lesseq_impl[of xs ys] by (cases "ms_lesseq_impl xs ys", auto) |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2225 |
|
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2226 |
lemma [code]: "multiset_of xs < multiset_of ys \<longleftrightarrow> ms_lesseq_impl xs ys = Some True" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2227 |
using ms_lesseq_impl[of xs ys] by (cases "ms_lesseq_impl xs ys", auto) |
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2228 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2229 |
instantiation multiset :: (equal) equal |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2230 |
begin |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2231 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2232 |
definition |
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2233 |
[code del]: "HOL.equal A (B :: 'a multiset) \<longleftrightarrow> A = B" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2234 |
lemma [code]: "HOL.equal (multiset_of xs) (multiset_of ys) \<longleftrightarrow> ms_lesseq_impl xs ys = Some False" |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2235 |
unfolding equal_multiset_def |
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2236 |
using ms_lesseq_impl[of xs ys] by (cases "ms_lesseq_impl xs ys", auto) |
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2237 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2238 |
instance |
55808
488c3e8282c8
added Rene Thiemann's patch for the nonterminating equality/subset test code for multisets
nipkow
parents:
55565
diff
changeset
|
2239 |
by default (simp add: equal_multiset_def) |
37169
f69efa106feb
make Nitpick "show_all" option behave less surprisingly
blanchet
parents:
37107
diff
changeset
|
2240 |
end |
49388 | 2241 |
|
51600
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2242 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2243 |
"msetsum (multiset_of xs) = listsum xs" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2244 |
by (induct xs) (simp_all add: add.commute) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2245 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2246 |
lemma [code]: |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2247 |
"msetprod (multiset_of xs) = fold times xs 1" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2248 |
proof - |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2249 |
have "\<And>x. fold times xs x = msetprod (multiset_of xs) * x" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2250 |
by (induct xs) (simp_all add: mult.assoc) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2251 |
then show ?thesis by simp |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2252 |
qed |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2253 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2254 |
text {* |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2255 |
Exercise for the casual reader: add implementations for @{const le_multiset} |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2256 |
and @{const less_multiset} (multiset order). |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2257 |
*} |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2258 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2259 |
text {* Quickcheck generators *} |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2260 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2261 |
definition (in term_syntax) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2262 |
msetify :: "'a\<Colon>typerep list \<times> (unit \<Rightarrow> Code_Evaluation.term) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2263 |
\<Rightarrow> 'a multiset \<times> (unit \<Rightarrow> Code_Evaluation.term)" where |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2264 |
[code_unfold]: "msetify xs = Code_Evaluation.valtermify multiset_of {\<cdot>} xs" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2265 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2266 |
notation fcomp (infixl "\<circ>>" 60) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2267 |
notation scomp (infixl "\<circ>\<rightarrow>" 60) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2268 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2269 |
instantiation multiset :: (random) random |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2270 |
begin |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2271 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2272 |
definition |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2273 |
"Quickcheck_Random.random i = Quickcheck_Random.random i \<circ>\<rightarrow> (\<lambda>xs. Pair (msetify xs))" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2274 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2275 |
instance .. |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2276 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2277 |
end |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2278 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2279 |
no_notation fcomp (infixl "\<circ>>" 60) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2280 |
no_notation scomp (infixl "\<circ>\<rightarrow>" 60) |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2281 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2282 |
instantiation multiset :: (full_exhaustive) full_exhaustive |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2283 |
begin |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2284 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2285 |
definition full_exhaustive_multiset :: "('a multiset \<times> (unit \<Rightarrow> term) \<Rightarrow> (bool \<times> term list) option) \<Rightarrow> natural \<Rightarrow> (bool \<times> term list) option" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2286 |
where |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2287 |
"full_exhaustive_multiset f i = Quickcheck_Exhaustive.full_exhaustive (\<lambda>xs. f (msetify xs)) i" |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2288 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2289 |
instance .. |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2290 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2291 |
end |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2292 |
|
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2293 |
hide_const (open) msetify |
197e25f13f0c
default implementation of multisets by list with reasonable coverage of operations on multisets
haftmann
parents:
51599
diff
changeset
|
2294 |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2295 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2296 |
subsection {* BNF setup *} |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2297 |
|
57966 | 2298 |
definition rel_mset where |
2299 |
"rel_mset R X Y \<longleftrightarrow> (\<exists>xs ys. multiset_of xs = X \<and> multiset_of ys = Y \<and> list_all2 R xs ys)" |
|
2300 |
||
2301 |
lemma multiset_of_zip_take_Cons_drop_twice: |
|
2302 |
assumes "length xs = length ys" "j \<le> length xs" |
|
2303 |
shows "multiset_of (zip (take j xs @ x # drop j xs) (take j ys @ y # drop j ys)) = |
|
2304 |
multiset_of (zip xs ys) + {#(x, y)#}" |
|
2305 |
using assms |
|
2306 |
proof (induct xs ys arbitrary: x y j rule: list_induct2) |
|
2307 |
case Nil |
|
2308 |
thus ?case |
|
2309 |
by simp |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2310 |
next |
57966 | 2311 |
case (Cons x xs y ys) |
2312 |
thus ?case |
|
2313 |
proof (cases "j = 0") |
|
2314 |
case True |
|
2315 |
thus ?thesis |
|
2316 |
by simp |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2317 |
next |
57966 | 2318 |
case False |
2319 |
then obtain k where k: "j = Suc k" |
|
2320 |
by (case_tac j) simp |
|
2321 |
hence "k \<le> length xs" |
|
2322 |
using Cons.prems by auto |
|
2323 |
hence "multiset_of (zip (take k xs @ x # drop k xs) (take k ys @ y # drop k ys)) = |
|
2324 |
multiset_of (zip xs ys) + {#(x, y)#}" |
|
2325 |
by (rule Cons.hyps(2)) |
|
2326 |
thus ?thesis |
|
2327 |
unfolding k by (auto simp: add.commute union_lcomm) |
|
58425 | 2328 |
qed |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2329 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2330 |
|
57966 | 2331 |
lemma ex_multiset_of_zip_left: |
2332 |
assumes "length xs = length ys" "multiset_of xs' = multiset_of xs" |
|
2333 |
shows "\<exists>ys'. length ys' = length xs' \<and> multiset_of (zip xs' ys') = multiset_of (zip xs ys)" |
|
58425 | 2334 |
using assms |
57966 | 2335 |
proof (induct xs ys arbitrary: xs' rule: list_induct2) |
2336 |
case Nil |
|
2337 |
thus ?case |
|
2338 |
by auto |
|
2339 |
next |
|
2340 |
case (Cons x xs y ys xs') |
|
2341 |
obtain j where j_len: "j < length xs'" and nth_j: "xs' ! j = x" |
|
58425 | 2342 |
by (metis Cons.prems in_set_conv_nth list.set_intros(1) multiset_of_eq_setD) |
2343 |
||
2344 |
def xsa \<equiv> "take j xs' @ drop (Suc j) xs'" |
|
57966 | 2345 |
have "multiset_of xs' = {#x#} + multiset_of xsa" |
2346 |
unfolding xsa_def using j_len nth_j |
|
58247
98d0f85d247f
enamed drop_Suc_conv_tl and nth_drop' to Cons_nth_drop_Suc
nipkow
parents:
58098
diff
changeset
|
2347 |
by (metis (no_types) ab_semigroup_add_class.add_ac(1) append_take_drop_id Cons_nth_drop_Suc |
59813 | 2348 |
multiset_of.simps(2) union_code add.commute) |
57966 | 2349 |
hence ms_x: "multiset_of xsa = multiset_of xs" |
2350 |
by (metis Cons.prems add.commute add_right_imp_eq multiset_of.simps(2)) |
|
2351 |
then obtain ysa where |
|
2352 |
len_a: "length ysa = length xsa" and ms_a: "multiset_of (zip xsa ysa) = multiset_of (zip xs ys)" |
|
2353 |
using Cons.hyps(2) by blast |
|
2354 |
||
2355 |
def ys' \<equiv> "take j ysa @ y # drop j ysa" |
|
2356 |
have xs': "xs' = take j xsa @ x # drop j xsa" |
|
2357 |
using ms_x j_len nth_j Cons.prems xsa_def |
|
58247
98d0f85d247f
enamed drop_Suc_conv_tl and nth_drop' to Cons_nth_drop_Suc
nipkow
parents:
58098
diff
changeset
|
2358 |
by (metis append_eq_append_conv append_take_drop_id diff_Suc_Suc Cons_nth_drop_Suc length_Cons |
59949 | 2359 |
length_drop size_multiset_of) |
57966 | 2360 |
have j_len': "j \<le> length xsa" |
2361 |
using j_len xs' xsa_def |
|
2362 |
by (metis add_Suc_right append_take_drop_id length_Cons length_append less_eq_Suc_le not_less) |
|
2363 |
have "length ys' = length xs'" |
|
2364 |
unfolding ys'_def using Cons.prems len_a ms_x |
|
2365 |
by (metis add_Suc_right append_take_drop_id length_Cons length_append multiset_of_eq_length) |
|
2366 |
moreover have "multiset_of (zip xs' ys') = multiset_of (zip (x # xs) (y # ys))" |
|
2367 |
unfolding xs' ys'_def |
|
2368 |
by (rule trans[OF multiset_of_zip_take_Cons_drop_twice]) |
|
2369 |
(auto simp: len_a ms_a j_len' add.commute) |
|
2370 |
ultimately show ?case |
|
2371 |
by blast |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2372 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2373 |
|
57966 | 2374 |
lemma list_all2_reorder_left_invariance: |
2375 |
assumes rel: "list_all2 R xs ys" and ms_x: "multiset_of xs' = multiset_of xs" |
|
2376 |
shows "\<exists>ys'. list_all2 R xs' ys' \<and> multiset_of ys' = multiset_of ys" |
|
2377 |
proof - |
|
2378 |
have len: "length xs = length ys" |
|
2379 |
using rel list_all2_conv_all_nth by auto |
|
2380 |
obtain ys' where |
|
2381 |
len': "length xs' = length ys'" and ms_xy: "multiset_of (zip xs' ys') = multiset_of (zip xs ys)" |
|
2382 |
using len ms_x by (metis ex_multiset_of_zip_left) |
|
2383 |
have "list_all2 R xs' ys'" |
|
2384 |
using assms(1) len' ms_xy unfolding list_all2_iff by (blast dest: multiset_of_eq_setD) |
|
2385 |
moreover have "multiset_of ys' = multiset_of ys" |
|
2386 |
using len len' ms_xy map_snd_zip multiset_of_map by metis |
|
2387 |
ultimately show ?thesis |
|
2388 |
by blast |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2389 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2390 |
|
57966 | 2391 |
lemma ex_multiset_of: "\<exists>xs. multiset_of xs = X" |
2392 |
by (induct X) (simp, metis multiset_of.simps(2)) |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2393 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2394 |
bnf "'a multiset" |
57966 | 2395 |
map: image_mset |
58425 | 2396 |
sets: set_of |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2397 |
bd: natLeq |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2398 |
wits: "{#}" |
57966 | 2399 |
rel: rel_mset |
2400 |
proof - |
|
2401 |
show "image_mset id = id" |
|
2402 |
by (rule image_mset.id) |
|
2403 |
next |
|
2404 |
show "\<And>f g. image_mset (g \<circ> f) = image_mset g \<circ> image_mset f" |
|
59813 | 2405 |
unfolding comp_def by (rule ext) (simp add: comp_def image_mset.compositionality) |
57966 | 2406 |
next |
2407 |
fix X :: "'a multiset" |
|
2408 |
show "\<And>f g. (\<And>z. z \<in> set_of X \<Longrightarrow> f z = g z) \<Longrightarrow> image_mset f X = image_mset g X" |
|
2409 |
by (induct X, (simp (no_asm))+, |
|
2410 |
metis One_nat_def Un_iff count_single mem_set_of_iff set_of_union zero_less_Suc) |
|
2411 |
next |
|
2412 |
show "\<And>f. set_of \<circ> image_mset f = op ` f \<circ> set_of" |
|
2413 |
by auto |
|
2414 |
next |
|
2415 |
show "card_order natLeq" |
|
2416 |
by (rule natLeq_card_order) |
|
2417 |
next |
|
2418 |
show "BNF_Cardinal_Arithmetic.cinfinite natLeq" |
|
2419 |
by (rule natLeq_cinfinite) |
|
2420 |
next |
|
2421 |
show "\<And>X. ordLeq3 (card_of (set_of X)) natLeq" |
|
2422 |
by transfer |
|
2423 |
(auto intro!: ordLess_imp_ordLeq simp: finite_iff_ordLess_natLeq[symmetric] multiset_def) |
|
2424 |
next |
|
2425 |
show "\<And>R S. rel_mset R OO rel_mset S \<le> rel_mset (R OO S)" |
|
2426 |
unfolding rel_mset_def[abs_def] OO_def |
|
2427 |
apply clarify |
|
2428 |
apply (rename_tac X Z Y xs ys' ys zs) |
|
2429 |
apply (drule_tac xs = ys' and ys = zs and xs' = ys in list_all2_reorder_left_invariance) |
|
2430 |
by (auto intro: list_all2_trans) |
|
2431 |
next |
|
2432 |
show "\<And>R. rel_mset R = |
|
2433 |
(BNF_Def.Grp {x. set_of x \<subseteq> {(x, y). R x y}} (image_mset fst))\<inverse>\<inverse> OO |
|
2434 |
BNF_Def.Grp {x. set_of x \<subseteq> {(x, y). R x y}} (image_mset snd)" |
|
2435 |
unfolding rel_mset_def[abs_def] BNF_Def.Grp_def OO_def |
|
2436 |
apply (rule ext)+ |
|
2437 |
apply auto |
|
59997 | 2438 |
apply (rule_tac x = "multiset_of (zip xs ys)" in exI; auto) |
57966 | 2439 |
apply (metis list_all2_lengthD map_fst_zip multiset_of_map) |
2440 |
apply (auto simp: list_all2_iff)[1] |
|
2441 |
apply (metis list_all2_lengthD map_snd_zip multiset_of_map) |
|
2442 |
apply (auto simp: list_all2_iff)[1] |
|
2443 |
apply (rename_tac XY) |
|
2444 |
apply (cut_tac X = XY in ex_multiset_of) |
|
2445 |
apply (erule exE) |
|
2446 |
apply (rename_tac xys) |
|
2447 |
apply (rule_tac x = "map fst xys" in exI) |
|
2448 |
apply (auto simp: multiset_of_map) |
|
2449 |
apply (rule_tac x = "map snd xys" in exI) |
|
59997 | 2450 |
apply (auto simp: multiset_of_map list_all2I subset_eq zip_map_fst_snd) |
2451 |
done |
|
57966 | 2452 |
next |
2453 |
show "\<And>z. z \<in> set_of {#} \<Longrightarrow> False" |
|
2454 |
by auto |
|
2455 |
qed |
|
2456 |
||
2457 |
inductive rel_mset' where |
|
2458 |
Zero[intro]: "rel_mset' R {#} {#}" |
|
2459 |
| Plus[intro]: "\<lbrakk>R a b; rel_mset' R M N\<rbrakk> \<Longrightarrow> rel_mset' R (M + {#a#}) (N + {#b#})" |
|
2460 |
||
2461 |
lemma rel_mset_Zero: "rel_mset R {#} {#}" |
|
2462 |
unfolding rel_mset_def Grp_def by auto |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2463 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2464 |
declare multiset.count[simp] |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2465 |
declare Abs_multiset_inverse[simp] |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2466 |
declare multiset.count_inverse[simp] |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2467 |
declare union_preserves_multiset[simp] |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2468 |
|
57966 | 2469 |
lemma rel_mset_Plus: |
2470 |
assumes ab: "R a b" and MN: "rel_mset R M N" |
|
2471 |
shows "rel_mset R (M + {#a#}) (N + {#b#})" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2472 |
proof- |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2473 |
{fix y assume "R a b" and "set_of y \<subseteq> {(x, y). R x y}" |
57966 | 2474 |
hence "\<exists>ya. image_mset fst y + {#a#} = image_mset fst ya \<and> |
2475 |
image_mset snd y + {#b#} = image_mset snd ya \<and> |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2476 |
set_of ya \<subseteq> {(x, y). R x y}" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2477 |
apply(intro exI[of _ "y + {#(a,b)#}"]) by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2478 |
} |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2479 |
thus ?thesis |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2480 |
using assms |
57966 | 2481 |
unfolding multiset.rel_compp_Grp Grp_def by blast |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2482 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2483 |
|
57966 | 2484 |
lemma rel_mset'_imp_rel_mset: |
59949 | 2485 |
"rel_mset' R M N \<Longrightarrow> rel_mset R M N" |
57966 | 2486 |
apply(induct rule: rel_mset'.induct) |
2487 |
using rel_mset_Zero rel_mset_Plus by auto |
|
2488 |
||
59949 | 2489 |
lemma rel_mset_size: |
2490 |
"rel_mset R M N \<Longrightarrow> size M = size N" |
|
2491 |
unfolding multiset.rel_compp_Grp Grp_def by auto |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2492 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2493 |
lemma multiset_induct2[case_names empty addL addR]: |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2494 |
assumes empty: "P {#} {#}" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2495 |
and addL: "\<And>M N a. P M N \<Longrightarrow> P (M + {#a#}) N" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2496 |
and addR: "\<And>M N a. P M N \<Longrightarrow> P M (N + {#a#})" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2497 |
shows "P M N" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2498 |
apply(induct N rule: multiset_induct) |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2499 |
apply(induct M rule: multiset_induct, rule empty, erule addL) |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2500 |
apply(induct M rule: multiset_induct, erule addR, erule addR) |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2501 |
done |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2502 |
|
59949 | 2503 |
lemma multiset_induct2_size[consumes 1, case_names empty add]: |
2504 |
assumes c: "size M = size N" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2505 |
and empty: "P {#} {#}" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2506 |
and add: "\<And>M N a b. P M N \<Longrightarrow> P (M + {#a#}) (N + {#b#})" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2507 |
shows "P M N" |
59949 | 2508 |
using c proof(induct M arbitrary: N rule: measure_induct_rule[of size]) |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2509 |
case (less M) show ?case |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2510 |
proof(cases "M = {#}") |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2511 |
case True hence "N = {#}" using less.prems by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2512 |
thus ?thesis using True empty by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2513 |
next |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2514 |
case False then obtain M1 a where M: "M = M1 + {#a#}" by (metis multi_nonempty_split) |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2515 |
have "N \<noteq> {#}" using False less.prems by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2516 |
then obtain N1 b where N: "N = N1 + {#b#}" by (metis multi_nonempty_split) |
59949 | 2517 |
have "size M1 = size N1" using less.prems unfolding M N by auto |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2518 |
thus ?thesis using M N less.hyps add by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2519 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2520 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2521 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2522 |
lemma msed_map_invL: |
57966 | 2523 |
assumes "image_mset f (M + {#a#}) = N" |
2524 |
shows "\<exists>N1. N = N1 + {#f a#} \<and> image_mset f M = N1" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2525 |
proof- |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2526 |
have "f a \<in># N" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2527 |
using assms multiset.set_map[of f "M + {#a#}"] by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2528 |
then obtain N1 where N: "N = N1 + {#f a#}" using multi_member_split by metis |
57966 | 2529 |
have "image_mset f M = N1" using assms unfolding N by simp |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2530 |
thus ?thesis using N by blast |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2531 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2532 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2533 |
lemma msed_map_invR: |
57966 | 2534 |
assumes "image_mset f M = N + {#b#}" |
2535 |
shows "\<exists>M1 a. M = M1 + {#a#} \<and> f a = b \<and> image_mset f M1 = N" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2536 |
proof- |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2537 |
obtain a where a: "a \<in># M" and fa: "f a = b" |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2538 |
using multiset.set_map[of f M] unfolding assms |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2539 |
by (metis image_iff mem_set_of_iff union_single_eq_member) |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2540 |
then obtain M1 where M: "M = M1 + {#a#}" using multi_member_split by metis |
57966 | 2541 |
have "image_mset f M1 = N" using assms unfolding M fa[symmetric] by simp |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2542 |
thus ?thesis using M fa by blast |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2543 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2544 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2545 |
lemma msed_rel_invL: |
57966 | 2546 |
assumes "rel_mset R (M + {#a#}) N" |
2547 |
shows "\<exists>N1 b. N = N1 + {#b#} \<and> R a b \<and> rel_mset R M N1" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2548 |
proof- |
57966 | 2549 |
obtain K where KM: "image_mset fst K = M + {#a#}" |
2550 |
and KN: "image_mset snd K = N" and sK: "set_of K \<subseteq> {(a, b). R a b}" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2551 |
using assms |
57966 | 2552 |
unfolding multiset.rel_compp_Grp Grp_def by auto |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2553 |
obtain K1 ab where K: "K = K1 + {#ab#}" and a: "fst ab = a" |
57966 | 2554 |
and K1M: "image_mset fst K1 = M" using msed_map_invR[OF KM] by auto |
2555 |
obtain N1 where N: "N = N1 + {#snd ab#}" and K1N1: "image_mset snd K1 = N1" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2556 |
using msed_map_invL[OF KN[unfolded K]] by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2557 |
have Rab: "R a (snd ab)" using sK a unfolding K by auto |
57966 | 2558 |
have "rel_mset R M N1" using sK K1M K1N1 |
2559 |
unfolding K multiset.rel_compp_Grp Grp_def by auto |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2560 |
thus ?thesis using N Rab by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2561 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2562 |
|
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2563 |
lemma msed_rel_invR: |
57966 | 2564 |
assumes "rel_mset R M (N + {#b#})" |
2565 |
shows "\<exists>M1 a. M = M1 + {#a#} \<and> R a b \<and> rel_mset R M1 N" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2566 |
proof- |
57966 | 2567 |
obtain K where KN: "image_mset snd K = N + {#b#}" |
2568 |
and KM: "image_mset fst K = M" and sK: "set_of K \<subseteq> {(a, b). R a b}" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2569 |
using assms |
57966 | 2570 |
unfolding multiset.rel_compp_Grp Grp_def by auto |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2571 |
obtain K1 ab where K: "K = K1 + {#ab#}" and b: "snd ab = b" |
57966 | 2572 |
and K1N: "image_mset snd K1 = N" using msed_map_invR[OF KN] by auto |
2573 |
obtain M1 where M: "M = M1 + {#fst ab#}" and K1M1: "image_mset fst K1 = M1" |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2574 |
using msed_map_invL[OF KM[unfolded K]] by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2575 |
have Rab: "R (fst ab) b" using sK b unfolding K by auto |
57966 | 2576 |
have "rel_mset R M1 N" using sK K1N K1M1 |
2577 |
unfolding K multiset.rel_compp_Grp Grp_def by auto |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2578 |
thus ?thesis using M Rab by auto |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2579 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2580 |
|
57966 | 2581 |
lemma rel_mset_imp_rel_mset': |
2582 |
assumes "rel_mset R M N" |
|
2583 |
shows "rel_mset' R M N" |
|
59949 | 2584 |
using assms proof(induct M arbitrary: N rule: measure_induct_rule[of size]) |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2585 |
case (less M) |
59949 | 2586 |
have c: "size M = size N" using rel_mset_size[OF less.prems] . |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
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diff
changeset
|
2587 |
show ?case |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2588 |
proof(cases "M = {#}") |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2589 |
case True hence "N = {#}" using c by simp |
57966 | 2590 |
thus ?thesis using True rel_mset'.Zero by auto |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2591 |
next |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2592 |
case False then obtain M1 a where M: "M = M1 + {#a#}" by (metis multi_nonempty_split) |
57966 | 2593 |
obtain N1 b where N: "N = N1 + {#b#}" and R: "R a b" and ms: "rel_mset R M1 N1" |
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2594 |
using msed_rel_invL[OF less.prems[unfolded M]] by auto |
57966 | 2595 |
have "rel_mset' R M1 N1" using less.hyps[of M1 N1] ms unfolding M by simp |
2596 |
thus ?thesis using rel_mset'.Plus[of R a b, OF R] unfolding M N by simp |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2597 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2598 |
qed |
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2599 |
|
57966 | 2600 |
lemma rel_mset_rel_mset': |
2601 |
"rel_mset R M N = rel_mset' R M N" |
|
2602 |
using rel_mset_imp_rel_mset' rel_mset'_imp_rel_mset by auto |
|
2603 |
||
2604 |
(* The main end product for rel_mset: inductive characterization *) |
|
2605 |
theorems rel_mset_induct[case_names empty add, induct pred: rel_mset] = |
|
2606 |
rel_mset'.induct[unfolded rel_mset_rel_mset'[symmetric]] |
|
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2607 |
|
56656 | 2608 |
|
2609 |
subsection {* Size setup *} |
|
2610 |
||
57966 | 2611 |
lemma multiset_size_o_map: "size_multiset g \<circ> image_mset f = size_multiset (g \<circ> f)" |
2612 |
unfolding o_apply by (rule ext) (induct_tac, auto) |
|
56656 | 2613 |
|
2614 |
setup {* |
|
2615 |
BNF_LFP_Size.register_size_global @{type_name multiset} @{const_name size_multiset} |
|
2616 |
@{thms size_multiset_empty size_multiset_single size_multiset_union size_empty size_single |
|
2617 |
size_union} |
|
2618 |
@{thms multiset_size_o_map} |
|
2619 |
*} |
|
2620 |
||
2621 |
hide_const (open) wcount |
|
2622 |
||
55129
26bd1cba3ab5
killed 'More_BNFs' by moving its various bits where they (now) belong
blanchet
parents:
54868
diff
changeset
|
2623 |
end |