| author | haftmann |
| Mon, 27 Sep 2010 14:13:22 +0200 | |
| changeset 39727 | 5dab9549c80d |
| parent 39380 | 5a2662c1e44a |
| child 39915 | ecf97cf3d248 |
| permissions | -rw-r--r-- |
| 35303 | 1 |
(* Author: Florian Haftmann, TU Muenchen *) |
2 |
||
3 |
header {* Lists with elements distinct as canonical example for datatype invariants *}
|
|
4 |
||
5 |
theory Dlist |
|
| 37473 | 6 |
imports Main Fset |
| 35303 | 7 |
begin |
8 |
||
9 |
section {* The type of distinct lists *}
|
|
10 |
||
11 |
typedef (open) 'a dlist = "{xs::'a list. distinct xs}"
|
|
12 |
morphisms list_of_dlist Abs_dlist |
|
13 |
proof |
|
14 |
show "[] \<in> ?dlist" by simp |
|
15 |
qed |
|
16 |
||
|
39380
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
17 |
lemma dlist_eq_iff: |
|
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
18 |
"dxs = dys \<longleftrightarrow> list_of_dlist dxs = list_of_dlist dys" |
|
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
19 |
by (simp add: list_of_dlist_inject) |
| 36274 | 20 |
|
|
39380
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
21 |
lemma dlist_eqI: |
|
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
22 |
"list_of_dlist dxs = list_of_dlist dys \<Longrightarrow> dxs = dys" |
|
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
23 |
by (simp add: dlist_eq_iff) |
|
36112
7fa17a225852
user interface for abstract datatypes is an attribute, not a command
haftmann
parents:
35688
diff
changeset
|
24 |
|
| 35303 | 25 |
text {* Formal, totalized constructor for @{typ "'a dlist"}: *}
|
26 |
||
27 |
definition Dlist :: "'a list \<Rightarrow> 'a dlist" where |
|
| 37765 | 28 |
"Dlist xs = Abs_dlist (remdups xs)" |
| 35303 | 29 |
|
|
39380
5a2662c1e44a
established emerging canonical names *_eqI and *_eq_iff
haftmann
parents:
38857
diff
changeset
|
30 |
lemma distinct_list_of_dlist [simp, intro]: |
| 35303 | 31 |
"distinct (list_of_dlist dxs)" |
32 |
using list_of_dlist [of dxs] by simp |
|
33 |
||
34 |
lemma list_of_dlist_Dlist [simp]: |
|
35 |
"list_of_dlist (Dlist xs) = remdups xs" |
|
36 |
by (simp add: Dlist_def Abs_dlist_inverse) |
|
37 |
||
| 39727 | 38 |
lemma remdups_list_of_dlist [simp]: |
39 |
"remdups (list_of_dlist dxs) = list_of_dlist dxs" |
|
40 |
by simp |
|
41 |
||
|
36112
7fa17a225852
user interface for abstract datatypes is an attribute, not a command
haftmann
parents:
35688
diff
changeset
|
42 |
lemma Dlist_list_of_dlist [simp, code abstype]: |
| 35303 | 43 |
"Dlist (list_of_dlist dxs) = dxs" |
44 |
by (simp add: Dlist_def list_of_dlist_inverse distinct_remdups_id) |
|
45 |
||
46 |
||
47 |
text {* Fundamental operations: *}
|
|
48 |
||
49 |
definition empty :: "'a dlist" where |
|
50 |
"empty = Dlist []" |
|
51 |
||
52 |
definition insert :: "'a \<Rightarrow> 'a dlist \<Rightarrow> 'a dlist" where |
|
53 |
"insert x dxs = Dlist (List.insert x (list_of_dlist dxs))" |
|
54 |
||
55 |
definition remove :: "'a \<Rightarrow> 'a dlist \<Rightarrow> 'a dlist" where |
|
56 |
"remove x dxs = Dlist (remove1 x (list_of_dlist dxs))" |
|
57 |
||
58 |
definition map :: "('a \<Rightarrow> 'b) \<Rightarrow> 'a dlist \<Rightarrow> 'b dlist" where
|
|
59 |
"map f dxs = Dlist (remdups (List.map f (list_of_dlist dxs)))" |
|
60 |
||
61 |
definition filter :: "('a \<Rightarrow> bool) \<Rightarrow> 'a dlist \<Rightarrow> 'a dlist" where
|
|
62 |
"filter P dxs = Dlist (List.filter P (list_of_dlist dxs))" |
|
63 |
||
64 |
||
65 |
text {* Derived operations: *}
|
|
66 |
||
67 |
definition null :: "'a dlist \<Rightarrow> bool" where |
|
68 |
"null dxs = List.null (list_of_dlist dxs)" |
|
69 |
||
70 |
definition member :: "'a dlist \<Rightarrow> 'a \<Rightarrow> bool" where |
|
71 |
"member dxs = List.member (list_of_dlist dxs)" |
|
72 |
||
73 |
definition length :: "'a dlist \<Rightarrow> nat" where |
|
74 |
"length dxs = List.length (list_of_dlist dxs)" |
|
75 |
||
76 |
definition fold :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'a dlist \<Rightarrow> 'b \<Rightarrow> 'b" where
|
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
77 |
"fold f dxs = More_List.fold f (list_of_dlist dxs)" |
|
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
78 |
|
|
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
79 |
definition foldr :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'a dlist \<Rightarrow> 'b \<Rightarrow> 'b" where
|
|
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
80 |
"foldr f dxs = List.foldr f (list_of_dlist dxs)" |
| 35303 | 81 |
|
82 |
||
83 |
section {* Executable version obeying invariant *}
|
|
84 |
||
85 |
lemma list_of_dlist_empty [simp, code abstract]: |
|
86 |
"list_of_dlist empty = []" |
|
87 |
by (simp add: empty_def) |
|
88 |
||
89 |
lemma list_of_dlist_insert [simp, code abstract]: |
|
90 |
"list_of_dlist (insert x dxs) = List.insert x (list_of_dlist dxs)" |
|
91 |
by (simp add: insert_def) |
|
92 |
||
93 |
lemma list_of_dlist_remove [simp, code abstract]: |
|
94 |
"list_of_dlist (remove x dxs) = remove1 x (list_of_dlist dxs)" |
|
95 |
by (simp add: remove_def) |
|
96 |
||
97 |
lemma list_of_dlist_map [simp, code abstract]: |
|
98 |
"list_of_dlist (map f dxs) = remdups (List.map f (list_of_dlist dxs))" |
|
99 |
by (simp add: map_def) |
|
100 |
||
101 |
lemma list_of_dlist_filter [simp, code abstract]: |
|
102 |
"list_of_dlist (filter P dxs) = List.filter P (list_of_dlist dxs)" |
|
103 |
by (simp add: filter_def) |
|
104 |
||
105 |
||
|
36980
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
106 |
text {* Explicit executable conversion *}
|
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
107 |
|
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
108 |
definition dlist_of_list [simp]: |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
109 |
"dlist_of_list = Dlist" |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
110 |
|
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
111 |
lemma [code abstract]: |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
112 |
"list_of_dlist (dlist_of_list xs) = remdups xs" |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
113 |
by simp |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
114 |
|
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
115 |
|
| 38512 | 116 |
text {* Equality *}
|
117 |
||
|
38857
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
118 |
instantiation dlist :: (equal) equal |
| 38512 | 119 |
begin |
120 |
||
|
38857
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
121 |
definition "HOL.equal dxs dys \<longleftrightarrow> HOL.equal (list_of_dlist dxs) (list_of_dlist dys)" |
| 38512 | 122 |
|
123 |
instance proof |
|
|
38857
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
124 |
qed (simp add: equal_dlist_def equal list_of_dlist_inject) |
| 38512 | 125 |
|
126 |
end |
|
127 |
||
|
38857
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
128 |
lemma [code nbe]: |
|
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
129 |
"HOL.equal (dxs :: 'a::equal dlist) dxs \<longleftrightarrow> True" |
|
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
130 |
by (fact equal_refl) |
|
97775f3e8722
renamed class/constant eq to equal; tuned some instantiations
haftmann
parents:
38512
diff
changeset
|
131 |
|
| 38512 | 132 |
|
| 37106 | 133 |
section {* Induction principle and case distinction *}
|
134 |
||
135 |
lemma dlist_induct [case_names empty insert, induct type: dlist]: |
|
136 |
assumes empty: "P empty" |
|
137 |
assumes insrt: "\<And>x dxs. \<not> member dxs x \<Longrightarrow> P dxs \<Longrightarrow> P (insert x dxs)" |
|
138 |
shows "P dxs" |
|
139 |
proof (cases dxs) |
|
140 |
case (Abs_dlist xs) |
|
141 |
then have "distinct xs" and dxs: "dxs = Dlist xs" by (simp_all add: Dlist_def distinct_remdups_id) |
|
142 |
from `distinct xs` have "P (Dlist xs)" |
|
143 |
proof (induct xs rule: distinct_induct) |
|
144 |
case Nil from empty show ?case by (simp add: empty_def) |
|
145 |
next |
|
146 |
case (insert x xs) |
|
147 |
then have "\<not> member (Dlist xs) x" and "P (Dlist xs)" |
|
|
37595
9591362629e3
dropped ancient infix mem; refined code generation operations in List.thy
haftmann
parents:
37473
diff
changeset
|
148 |
by (simp_all add: member_def List.member_def) |
| 37106 | 149 |
with insrt have "P (insert x (Dlist xs))" . |
150 |
with insert show ?case by (simp add: insert_def distinct_remdups_id) |
|
151 |
qed |
|
152 |
with dxs show "P dxs" by simp |
|
153 |
qed |
|
154 |
||
155 |
lemma dlist_case [case_names empty insert, cases type: dlist]: |
|
156 |
assumes empty: "dxs = empty \<Longrightarrow> P" |
|
157 |
assumes insert: "\<And>x dys. \<not> member dys x \<Longrightarrow> dxs = insert x dys \<Longrightarrow> P" |
|
158 |
shows P |
|
159 |
proof (cases dxs) |
|
160 |
case (Abs_dlist xs) |
|
161 |
then have dxs: "dxs = Dlist xs" and distinct: "distinct xs" |
|
162 |
by (simp_all add: Dlist_def distinct_remdups_id) |
|
163 |
show P proof (cases xs) |
|
164 |
case Nil with dxs have "dxs = empty" by (simp add: empty_def) |
|
165 |
with empty show P . |
|
166 |
next |
|
167 |
case (Cons x xs) |
|
168 |
with dxs distinct have "\<not> member (Dlist xs) x" |
|
169 |
and "dxs = insert x (Dlist xs)" |
|
|
37595
9591362629e3
dropped ancient infix mem; refined code generation operations in List.thy
haftmann
parents:
37473
diff
changeset
|
170 |
by (simp_all add: member_def List.member_def insert_def distinct_remdups_id) |
| 37106 | 171 |
with insert show P . |
172 |
qed |
|
173 |
qed |
|
174 |
||
175 |
||
| 35303 | 176 |
section {* Implementation of sets by distinct lists -- canonical! *}
|
177 |
||
178 |
definition Set :: "'a dlist \<Rightarrow> 'a fset" where |
|
179 |
"Set dxs = Fset.Set (list_of_dlist dxs)" |
|
180 |
||
181 |
definition Coset :: "'a dlist \<Rightarrow> 'a fset" where |
|
182 |
"Coset dxs = Fset.Coset (list_of_dlist dxs)" |
|
183 |
||
184 |
code_datatype Set Coset |
|
185 |
||
186 |
declare member_code [code del] |
|
187 |
declare is_empty_Set [code del] |
|
188 |
declare empty_Set [code del] |
|
189 |
declare UNIV_Set [code del] |
|
190 |
declare insert_Set [code del] |
|
191 |
declare remove_Set [code del] |
|
| 37029 | 192 |
declare compl_Set [code del] |
193 |
declare compl_Coset [code del] |
|
| 35303 | 194 |
declare map_Set [code del] |
195 |
declare filter_Set [code del] |
|
196 |
declare forall_Set [code del] |
|
197 |
declare exists_Set [code del] |
|
198 |
declare card_Set [code del] |
|
199 |
declare inter_project [code del] |
|
200 |
declare subtract_remove [code del] |
|
201 |
declare union_insert [code del] |
|
202 |
declare Infimum_inf [code del] |
|
203 |
declare Supremum_sup [code del] |
|
204 |
||
205 |
lemma Set_Dlist [simp]: |
|
206 |
"Set (Dlist xs) = Fset (set xs)" |
|
| 37473 | 207 |
by (rule fset_eqI) (simp add: Set_def) |
| 35303 | 208 |
|
209 |
lemma Coset_Dlist [simp]: |
|
210 |
"Coset (Dlist xs) = Fset (- set xs)" |
|
| 37473 | 211 |
by (rule fset_eqI) (simp add: Coset_def) |
| 35303 | 212 |
|
213 |
lemma member_Set [simp]: |
|
214 |
"Fset.member (Set dxs) = List.member (list_of_dlist dxs)" |
|
215 |
by (simp add: Set_def member_set) |
|
216 |
||
217 |
lemma member_Coset [simp]: |
|
218 |
"Fset.member (Coset dxs) = Not \<circ> List.member (list_of_dlist dxs)" |
|
219 |
by (simp add: Coset_def member_set not_set_compl) |
|
220 |
||
|
36980
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
221 |
lemma Set_dlist_of_list [code]: |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
222 |
"Fset.Set xs = Set (dlist_of_list xs)" |
| 37473 | 223 |
by (rule fset_eqI) simp |
|
36980
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
224 |
|
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
225 |
lemma Coset_dlist_of_list [code]: |
|
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
226 |
"Fset.Coset xs = Coset (dlist_of_list xs)" |
| 37473 | 227 |
by (rule fset_eqI) simp |
|
36980
1a4cc941171a
added implementations of Fset.Set, Fset.Coset; do not delete code equations for relational operators on fsets
haftmann
parents:
36274
diff
changeset
|
228 |
|
| 35303 | 229 |
lemma is_empty_Set [code]: |
230 |
"Fset.is_empty (Set dxs) \<longleftrightarrow> null dxs" |
|
|
37595
9591362629e3
dropped ancient infix mem; refined code generation operations in List.thy
haftmann
parents:
37473
diff
changeset
|
231 |
by (simp add: null_def List.null_def member_set) |
| 35303 | 232 |
|
233 |
lemma bot_code [code]: |
|
234 |
"bot = Set empty" |
|
235 |
by (simp add: empty_def) |
|
236 |
||
237 |
lemma top_code [code]: |
|
238 |
"top = Coset empty" |
|
239 |
by (simp add: empty_def) |
|
240 |
||
241 |
lemma insert_code [code]: |
|
242 |
"Fset.insert x (Set dxs) = Set (insert x dxs)" |
|
243 |
"Fset.insert x (Coset dxs) = Coset (remove x dxs)" |
|
244 |
by (simp_all add: insert_def remove_def member_set not_set_compl) |
|
245 |
||
246 |
lemma remove_code [code]: |
|
247 |
"Fset.remove x (Set dxs) = Set (remove x dxs)" |
|
248 |
"Fset.remove x (Coset dxs) = Coset (insert x dxs)" |
|
249 |
by (auto simp add: insert_def remove_def member_set not_set_compl) |
|
250 |
||
251 |
lemma member_code [code]: |
|
252 |
"Fset.member (Set dxs) = member dxs" |
|
253 |
"Fset.member (Coset dxs) = Not \<circ> member dxs" |
|
254 |
by (simp_all add: member_def) |
|
255 |
||
| 37029 | 256 |
lemma compl_code [code]: |
257 |
"- Set dxs = Coset dxs" |
|
258 |
"- Coset dxs = Set dxs" |
|
| 37473 | 259 |
by (rule fset_eqI, simp add: member_set not_set_compl)+ |
| 37029 | 260 |
|
| 35303 | 261 |
lemma map_code [code]: |
262 |
"Fset.map f (Set dxs) = Set (map f dxs)" |
|
| 37473 | 263 |
by (rule fset_eqI) (simp add: member_set) |
| 35303 | 264 |
|
265 |
lemma filter_code [code]: |
|
266 |
"Fset.filter f (Set dxs) = Set (filter f dxs)" |
|
| 37473 | 267 |
by (rule fset_eqI) (simp add: member_set) |
| 35303 | 268 |
|
269 |
lemma forall_Set [code]: |
|
270 |
"Fset.forall P (Set xs) \<longleftrightarrow> list_all P (list_of_dlist xs)" |
|
271 |
by (simp add: member_set list_all_iff) |
|
272 |
||
273 |
lemma exists_Set [code]: |
|
274 |
"Fset.exists P (Set xs) \<longleftrightarrow> list_ex P (list_of_dlist xs)" |
|
275 |
by (simp add: member_set list_ex_iff) |
|
276 |
||
277 |
lemma card_code [code]: |
|
278 |
"Fset.card (Set dxs) = length dxs" |
|
279 |
by (simp add: length_def member_set distinct_card) |
|
280 |
||
281 |
lemma inter_code [code]: |
|
282 |
"inf A (Set xs) = Set (filter (Fset.member A) xs)" |
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
283 |
"inf A (Coset xs) = foldr Fset.remove xs A" |
|
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
284 |
by (simp_all only: Set_def Coset_def foldr_def inter_project list_of_dlist_filter) |
| 35303 | 285 |
|
286 |
lemma subtract_code [code]: |
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
287 |
"A - Set xs = foldr Fset.remove xs A" |
| 35303 | 288 |
"A - Coset xs = Set (filter (Fset.member A) xs)" |
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
289 |
by (simp_all only: Set_def Coset_def foldr_def subtract_remove list_of_dlist_filter) |
| 35303 | 290 |
|
291 |
lemma union_code [code]: |
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
292 |
"sup (Set xs) A = foldr Fset.insert xs A" |
| 35303 | 293 |
"sup (Coset xs) A = Coset (filter (Not \<circ> Fset.member A) xs)" |
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
294 |
by (simp_all only: Set_def Coset_def foldr_def union_insert list_of_dlist_filter) |
| 35303 | 295 |
|
296 |
context complete_lattice |
|
297 |
begin |
|
298 |
||
299 |
lemma Infimum_code [code]: |
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
300 |
"Infimum (Set As) = foldr inf As top" |
|
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
301 |
by (simp only: Set_def Infimum_inf foldr_def inf.commute) |
| 35303 | 302 |
|
303 |
lemma Supremum_code [code]: |
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
304 |
"Supremum (Set As) = foldr sup As bot" |
|
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
305 |
by (simp only: Set_def Supremum_sup foldr_def sup.commute) |
| 35303 | 306 |
|
307 |
end |
|
308 |
||
| 38512 | 309 |
|
|
37022
f9681d9d1d56
moved generic List operations to theory More_List
haftmann
parents:
36980
diff
changeset
|
310 |
hide_const (open) member fold foldr empty insert remove map filter null member length fold |
| 35303 | 311 |
|
312 |
end |