isabelle: src/HOL/Library/RBT.thy@2803d2b8f85d (annotated)

48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	1	(* Title: HOL/Library/RBT.thy
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	2	Author: Lukas Bulwahn and Ondrej Kuncar
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	3	*)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	4
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	5	section \<open>Abstract type of RBT trees\<close>
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	6
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	7	theory RBT
53013 3fbcfa911863 remove unnecessary dependencies on Library/Quotient_* kuncar parents: 51375 diff changeset	8	imports Main RBT_Impl
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	9	begin
a6528fb99641 added Table.thy haftmann parents: diff changeset	10
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	11	subsection \<open>Type definition\<close>
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	12
61260 e6f03fae14d5 explicit indication of overloaded typedefs; wenzelm parents: 61076 diff changeset	13	typedef (overloaded) ('a, 'b) rbt = "{t :: ('a::linorder, 'b) RBT_Impl.rbt. is_rbt t}"
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	14	morphisms impl_of RBT
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	15	proof -
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	16	have "RBT_Impl.Empty \<in> ?rbt" by simp
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	17	then show ?thesis ..
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	18	qed
a6528fb99641 added Table.thy haftmann parents: diff changeset	19
39380 5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	20	lemma rbt_eq_iff:
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	21	"t1 = t2 \<longleftrightarrow> impl_of t1 = impl_of t2"
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	22	by (simp add: impl_of_inject)
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	23
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	24	lemma rbt_eqI:
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	25	"impl_of t1 = impl_of t2 \<Longrightarrow> t1 = t2"
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	26	by (simp add: rbt_eq_iff)
5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	27
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	28	lemma is_rbt_impl_of [simp, intro]:
b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	29	"is_rbt (impl_of t)"
b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	30	using impl_of [of t] by simp
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	31
39380 5a2662c1e44a established emerging canonical names _eqI and _eq_iff haftmann parents: 39302 diff changeset	32	lemma RBT_impl_of [simp, code abstype]:
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	33	"RBT (impl_of t) = t"
b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	34	by (simp add: impl_of_inverse)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	35
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	36	subsection \<open>Primitive operations\<close>
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	37
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	38	setup_lifting type_definition_rbt
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	39
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	40	lift_definition lookup :: "('a::linorder, 'b) rbt \<Rightarrow> 'a \<rightharpoonup> 'b" is "rbt_lookup" .
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	41
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	42	lift_definition empty :: "('a::linorder, 'b) rbt" is RBT_Impl.Empty
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	43	by (simp add: empty_def)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	44
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	45	lift_definition insert :: "'a::linorder \<Rightarrow> 'b \<Rightarrow> ('a, 'b) rbt \<Rightarrow> ('a, 'b) rbt" is "rbt_insert"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	46	by simp
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	47
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	48	lift_definition delete :: "'a::linorder \<Rightarrow> ('a, 'b) rbt \<Rightarrow> ('a, 'b) rbt" is "rbt_delete"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	49	by simp
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	50
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	51	lift_definition entries :: "('a::linorder, 'b) rbt \<Rightarrow> ('a \<times> 'b) list" is RBT_Impl.entries .
55565 f663fc1e653b simplify proofs because of the stronger reflexivity prover kuncar parents: 55466 diff changeset	52
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	53	lift_definition keys :: "('a::linorder, 'b) rbt \<Rightarrow> 'a list" is RBT_Impl.keys .
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	54
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	55	lift_definition bulkload :: "('a::linorder \<times> 'b) list \<Rightarrow> ('a, 'b) rbt" is "rbt_bulkload" ..
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	56
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	57	lift_definition map_entry :: "'a \<Rightarrow> ('b \<Rightarrow> 'b) \<Rightarrow> ('a::linorder, 'b) rbt \<Rightarrow> ('a, 'b) rbt" is rbt_map_entry
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	58	by simp
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	59
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	60	lift_definition map :: "('a \<Rightarrow> 'b \<Rightarrow> 'c) \<Rightarrow> ('a::linorder, 'b) rbt \<Rightarrow> ('a, 'c) rbt" is RBT_Impl.map
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	61	by simp
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	62
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	63	lift_definition fold :: "('a \<Rightarrow> 'b \<Rightarrow> 'c \<Rightarrow> 'c) \<Rightarrow> ('a::linorder, 'b) rbt \<Rightarrow> 'c \<Rightarrow> 'c" is RBT_Impl.fold .
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	64
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	65	lift_definition union :: "('a::linorder, 'b) rbt \<Rightarrow> ('a, 'b) rbt \<Rightarrow> ('a, 'b) rbt" is "rbt_union"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	66	by (simp add: rbt_union_is_rbt)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	67
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	68	lift_definition foldi :: "('c \<Rightarrow> bool) \<Rightarrow> ('a \<Rightarrow> 'b \<Rightarrow> 'c \<Rightarrow> 'c) \<Rightarrow> ('a :: linorder, 'b) rbt \<Rightarrow> 'c \<Rightarrow> 'c"
55565 f663fc1e653b simplify proofs because of the stronger reflexivity prover kuncar parents: 55466 diff changeset	69	is RBT_Impl.foldi .
63194 0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	70
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	71	lift_definition combine_with_key :: "('a \<Rightarrow> 'b \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> ('a::linorder, 'b) rbt \<Rightarrow> ('a, 'b) rbt \<Rightarrow> ('a, 'b) rbt"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	72	is RBT_Impl.rbt_union_with_key by (rule is_rbt_rbt_unionwk)
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	73
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	74	lift_definition combine :: "('b \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> ('a::linorder, 'b) rbt \<Rightarrow> ('a, 'b) rbt \<Rightarrow> ('a, 'b) rbt"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	75	is RBT_Impl.rbt_union_with by (rule rbt_unionw_is_rbt)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	76
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	77	subsection \<open>Derived operations\<close>
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	78
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 60500 diff changeset	79	definition is_empty :: "('a::linorder, 'b) rbt \<Rightarrow> bool" where
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	80	[code]: "is_empty t = (case impl_of t of RBT_Impl.Empty \<Rightarrow> True \| _ \<Rightarrow> False)"
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	81
63194 0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	82	(* TODO: Is deleting more efficient than re-building the tree?
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	83	(Probably more difficult to prove though *)
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	84	definition filter :: "('a \<Rightarrow> 'b \<Rightarrow> bool) \<Rightarrow> ('a::linorder, 'b) rbt \<Rightarrow> ('a, 'b) rbt" where
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	85	[code]: "filter P t = fold (\<lambda>k v t. if P k v then insert k v t else t) t empty"
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	86
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	87	subsection \<open>Abstract lookup properties\<close>
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	88
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	89	lemma lookup_RBT:
47450 2ada2be850cb move RBT implementation into type class contexts Andreas Lochbihler parents: 46565 diff changeset	90	"is_rbt t \<Longrightarrow> lookup (RBT t) = rbt_lookup t"
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	91	by (simp add: lookup_def RBT_inverse)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	92
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	93	lemma lookup_impl_of:
47450 2ada2be850cb move RBT implementation into type class contexts Andreas Lochbihler parents: 46565 diff changeset	94	"rbt_lookup (impl_of t) = lookup t"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	95	by transfer (rule refl)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	96
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	97	lemma entries_impl_of:
b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	98	"RBT_Impl.entries (impl_of t) = entries t"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	99	by transfer (rule refl)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	100
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	101	lemma keys_impl_of:
b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	102	"RBT_Impl.keys (impl_of t) = keys t"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	103	by transfer (rule refl)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	104
49927 cde0a46b4224 new theorem kuncar parents: 49834 diff changeset	105	lemma lookup_keys:
cde0a46b4224 new theorem kuncar parents: 49834 diff changeset	106	"dom (lookup t) = set (keys t)"
cde0a46b4224 new theorem kuncar parents: 49834 diff changeset	107	by transfer (simp add: rbt_lookup_keys)
cde0a46b4224 new theorem kuncar parents: 49834 diff changeset	108
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	109	lemma lookup_empty [simp]:
a6528fb99641 added Table.thy haftmann parents: diff changeset	110	"lookup empty = Map.empty"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	111	by (simp add: empty_def lookup_RBT fun_eq_iff)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	112
36147 b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	113	lemma lookup_insert [simp]:
b43b22f63665 theory RBT with abstract type of red-black trees backed by implementation RBT_Impl haftmann parents: 36111 diff changeset	114	"lookup (insert k v t) = (lookup t)(k \<mapsto> v)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	115	by transfer (rule rbt_lookup_rbt_insert)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	116
a6528fb99641 added Table.thy haftmann parents: diff changeset	117	lemma lookup_delete [simp]:
a6528fb99641 added Table.thy haftmann parents: diff changeset	118	"lookup (delete k t) = (lookup t)(k := None)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	119	by transfer (simp add: rbt_lookup_rbt_delete restrict_complement_singleton_eq)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	120
a6528fb99641 added Table.thy haftmann parents: diff changeset	121	lemma map_of_entries [simp]:
a6528fb99641 added Table.thy haftmann parents: diff changeset	122	"map_of (entries t) = lookup t"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	123	by transfer (simp add: map_of_entries)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	124
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	125	lemma entries_lookup:
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	126	"entries t1 = entries t2 \<longleftrightarrow> lookup t1 = lookup t2"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	127	by transfer (simp add: entries_rbt_lookup)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	128
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	129	lemma lookup_bulkload [simp]:
a6528fb99641 added Table.thy haftmann parents: diff changeset	130	"lookup (bulkload xs) = map_of xs"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	131	by transfer (rule rbt_lookup_rbt_bulkload)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	132
a6528fb99641 added Table.thy haftmann parents: diff changeset	133	lemma lookup_map_entry [simp]:
55466 786edc984c98 merged 'Option.map' and 'Option.map_option' blanchet parents: 55414 diff changeset	134	"lookup (map_entry k f t) = (lookup t)(k := map_option f (lookup t k))"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	135	by transfer (rule rbt_lookup_rbt_map_entry)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	136
a6528fb99641 added Table.thy haftmann parents: diff changeset	137	lemma lookup_map [simp]:
55466 786edc984c98 merged 'Option.map' and 'Option.map_option' blanchet parents: 55414 diff changeset	138	"lookup (map f t) k = map_option (f k) (lookup t k)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	139	by transfer (rule rbt_lookup_map)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	140
63194 0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	141	lemma lookup_combine_with_key [simp]:
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	142	"lookup (combine_with_key f t1 t2) k = combine_options (f k) (lookup t1 k) (lookup t2 k)"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	143	by transfer (simp_all add: combine_options_def rbt_lookup_rbt_unionwk)
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	144
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	145	lemma combine_altdef: "combine f t1 t2 = combine_with_key (\<lambda>_. f) t1 t2"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	146	by transfer (simp add: rbt_union_with_def)
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	147
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	148	lemma lookup_combine [simp]:
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	149	"lookup (combine f t1 t2) k = combine_options f (lookup t1 k) (lookup t2 k)"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	150	by (simp add: combine_altdef)
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	151
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	152	lemma fold_fold:
55414 eab03e9cee8a renamed '{prod,sum,bool,unit}_case' to 'case_...' blanchet parents: 53013 diff changeset	153	"fold f t = List.fold (case_prod f) (entries t)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	154	by transfer (rule RBT_Impl.fold_def)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	155
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	156	lemma impl_of_empty:
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	157	"impl_of empty = RBT_Impl.Empty"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	158	by transfer (rule refl)
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	159
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	160	lemma is_empty_empty [simp]:
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	161	"is_empty t \<longleftrightarrow> t = empty"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	162	unfolding is_empty_def by transfer (simp split: rbt.split)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	163
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	164	lemma RBT_lookup_empty [simp]: (FIXME)
47450 2ada2be850cb move RBT implementation into type class contexts Andreas Lochbihler parents: 46565 diff changeset	165	"rbt_lookup t = Map.empty \<longleftrightarrow> t = RBT_Impl.Empty"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	166	by (cases t) (auto simp add: fun_eq_iff)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	167
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	168	lemma lookup_empty_empty [simp]:
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	169	"lookup t = Map.empty \<longleftrightarrow> t = empty"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	170	by transfer (rule RBT_lookup_empty)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	171
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	172	lemma sorted_keys [iff]:
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	173	"sorted (keys t)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	174	by transfer (simp add: RBT_Impl.keys_def rbt_sorted_entries)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	175
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	176	lemma distinct_keys [iff]:
5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	177	"distinct (keys t)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	178	by transfer (simp add: RBT_Impl.keys_def distinct_entries)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	179
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	180	lemma finite_dom_lookup [simp, intro!]: "finite (dom (lookup t))"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	181	by transfer simp
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	182
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	183	lemma lookup_union: "lookup (union s t) = lookup s ++ lookup t"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	184	by transfer (simp add: rbt_lookup_rbt_union)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	185
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	186	lemma lookup_in_tree: "(lookup t k = Some v) = ((k, v) \<in> set (entries t))"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	187	by transfer (simp add: rbt_lookup_in_tree)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	188
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	189	lemma keys_entries: "(k \<in> set (keys t)) = (\<exists>v. (k, v) \<in> set (entries t))"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	190	by transfer (simp add: keys_entries)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	191
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	192	lemma fold_def_alt:
55414 eab03e9cee8a renamed '{prod,sum,bool,unit}_case' to 'case_...' blanchet parents: 53013 diff changeset	193	"fold f t = List.fold (case_prod f) (entries t)"
48622 caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	194	by transfer (auto simp: RBT_Impl.fold_def)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	195
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	196	lemma distinct_entries: "distinct (List.map fst (entries t))"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	197	by transfer (simp add: distinct_entries)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	198
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	199	lemma non_empty_keys: "t \<noteq> empty \<Longrightarrow> keys t \<noteq> []"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	200	by transfer (simp add: non_empty_rbt_keys)
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	201
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	202	lemma keys_def_alt:
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	203	"keys t = List.map fst (entries t)"
caaa1a02c650 use lifting/transfer formalization of RBT from Lift_RBT kuncar parents: 47450 diff changeset	204	by transfer (simp add: RBT_Impl.keys_def)
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	205
63194 0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	206	context
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	207	begin
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	208
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	209	private lemma lookup_filter_aux:
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	210	assumes "distinct (List.map fst xs)"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	211	shows "lookup (List.fold (\<lambda>(k, v) t. if P k v then insert k v t else t) xs t) k =
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	212	(case map_of xs k of
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	213	None \<Rightarrow> lookup t k
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	214	\| Some v \<Rightarrow> if P k v then Some v else lookup t k)"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	215	using assms by (induction xs arbitrary: t) (force split: option.splits)+
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	216
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	217	lemma lookup_filter:
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	218	"lookup (filter P t) k =
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	219	(case lookup t k of None \<Rightarrow> None \| Some v \<Rightarrow> if P k v then Some v else None)"
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	220	unfolding filter_def using lookup_filter_aux[of "entries t" P empty k]
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	221	by (simp add: fold_fold distinct_entries split: option.splits)
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	222
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	223	end
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	224
0b7bdb75f451 Added code generation for PMFs eberlm parents: 61260 diff changeset	225
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	226	subsection \<open>Quickcheck generators\<close>
45928 874845660119 adding quickcheck generators in some HOL-Library theories bulwahn parents: 45694 diff changeset	227
46565 ad21900e0ee9 subtype preprocessing in Quickcheck; bulwahn parents: 46133 diff changeset	228	quickcheck_generator rbt predicate: is_rbt constructors: empty, insert
36111 5844017e31f8 implementation of mappings by rbts haftmann parents: 35617 diff changeset	229
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	230	subsection \<open>Hide implementation details\<close>
56019 682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	231
682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	232	lifting_update rbt.lifting
682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	233	lifting_forget rbt.lifting
682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	234
682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	235	hide_const (open) impl_of empty lookup keys entries bulkload delete map fold union insert map_entry foldi
63219 a5697f7a3322 Hid RBT.filter Manuel Eberl <eberlm@in.tum.de> parents: 63194 diff changeset	236	is_empty filter
56019 682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	237	hide_fact (open) empty_def lookup_def keys_def entries_def bulkload_def delete_def map_def fold_def
63219 a5697f7a3322 Hid RBT.filter Manuel Eberl <eberlm@in.tum.de> parents: 63194 diff changeset	238	union_def insert_def map_entry_def foldi_def is_empty_def filter_def
56019 682bba24e474 hide implementation details kuncar parents: 55565 diff changeset	239
35617 a6528fb99641 added Table.thy haftmann parents: diff changeset	240	end

author	wenzelm
	Tue, 19 Jul 2016 09:55:03 +0200
changeset 63520	2803d2b8f85d
parent 63219	a5697f7a3322
child 73832	9db620f007fa
permissions	-rw-r--r--