(* Title: HOL/Set.thy
ID: $Id$
Author: Tobias Nipkow, Lawrence C Paulson and Markus Wenzel
License: GPL (GNU GENERAL PUBLIC LICENSE)
*)
header {* Set theory for higher-order logic *}
theory Set = HOL:
text {* A set in HOL is simply a predicate. *}
subsection {* Basic syntax *}
global
typedecl 'a set
arities set :: (type) type
consts
"{}" :: "'a set" ("{}")
UNIV :: "'a set"
insert :: "'a => 'a set => 'a set"
Collect :: "('a => bool) => 'a set" -- "comprehension"
Int :: "'a set => 'a set => 'a set" (infixl 70)
Un :: "'a set => 'a set => 'a set" (infixl 65)
UNION :: "'a set => ('a => 'b set) => 'b set" -- "general union"
INTER :: "'a set => ('a => 'b set) => 'b set" -- "general intersection"
Union :: "'a set set => 'a set" -- "union of a set"
Inter :: "'a set set => 'a set" -- "intersection of a set"
Pow :: "'a set => 'a set set" -- "powerset"
Ball :: "'a set => ('a => bool) => bool" -- "bounded universal quantifiers"
Bex :: "'a set => ('a => bool) => bool" -- "bounded existential quantifiers"
image :: "('a => 'b) => 'a set => 'b set" (infixr "`" 90)
syntax
"op :" :: "'a => 'a set => bool" ("op :")
consts
"op :" :: "'a => 'a set => bool" ("(_/ : _)" [50, 51] 50) -- "membership"
local
instance set :: (type) ord ..
instance set :: (type) minus ..
subsection {* Additional concrete syntax *}
syntax
range :: "('a => 'b) => 'b set" -- "of function"
"op ~:" :: "'a => 'a set => bool" ("op ~:") -- "non-membership"
"op ~:" :: "'a => 'a set => bool" ("(_/ ~: _)" [50, 51] 50)
"@Finset" :: "args => 'a set" ("{(_)}")
"@Coll" :: "pttrn => bool => 'a set" ("(1{_./ _})")
"@SetCompr" :: "'a => idts => bool => 'a set" ("(1{_ |/_./ _})")
"@INTER1" :: "pttrns => 'b set => 'b set" ("(3INT _./ _)" 10)
"@UNION1" :: "pttrns => 'b set => 'b set" ("(3UN _./ _)" 10)
"@INTER" :: "pttrn => 'a set => 'b set => 'b set" ("(3INT _:_./ _)" 10)
"@UNION" :: "pttrn => 'a set => 'b set => 'b set" ("(3UN _:_./ _)" 10)
"_Ball" :: "pttrn => 'a set => bool => bool" ("(3ALL _:_./ _)" [0, 0, 10] 10)
"_Bex" :: "pttrn => 'a set => bool => bool" ("(3EX _:_./ _)" [0, 0, 10] 10)
syntax (HOL)
"_Ball" :: "pttrn => 'a set => bool => bool" ("(3! _:_./ _)" [0, 0, 10] 10)
"_Bex" :: "pttrn => 'a set => bool => bool" ("(3? _:_./ _)" [0, 0, 10] 10)
translations
"range f" == "f`UNIV"
"x ~: y" == "~ (x : y)"
"{x, xs}" == "insert x {xs}"
"{x}" == "insert x {}"
"{x. P}" == "Collect (%x. P)"
"UN x y. B" == "UN x. UN y. B"
"UN x. B" == "UNION UNIV (%x. B)"
"UN x. B" == "UN x:UNIV. B"
"INT x y. B" == "INT x. INT y. B"
"INT x. B" == "INTER UNIV (%x. B)"
"INT x. B" == "INT x:UNIV. B"
"UN x:A. B" == "UNION A (%x. B)"
"INT x:A. B" == "INTER A (%x. B)"
"ALL x:A. P" == "Ball A (%x. P)"
"EX x:A. P" == "Bex A (%x. P)"
syntax (output)
"_setle" :: "'a set => 'a set => bool" ("op <=")
"_setle" :: "'a set => 'a set => bool" ("(_/ <= _)" [50, 51] 50)
"_setless" :: "'a set => 'a set => bool" ("op <")
"_setless" :: "'a set => 'a set => bool" ("(_/ < _)" [50, 51] 50)
syntax (xsymbols)
"_setle" :: "'a set => 'a set => bool" ("op \<subseteq>")
"_setle" :: "'a set => 'a set => bool" ("(_/ \<subseteq> _)" [50, 51] 50)
"_setless" :: "'a set => 'a set => bool" ("op \<subset>")
"_setless" :: "'a set => 'a set => bool" ("(_/ \<subset> _)" [50, 51] 50)
"op Int" :: "'a set => 'a set => 'a set" (infixl "\<inter>" 70)
"op Un" :: "'a set => 'a set => 'a set" (infixl "\<union>" 65)
"op :" :: "'a => 'a set => bool" ("op \<in>")
"op :" :: "'a => 'a set => bool" ("(_/ \<in> _)" [50, 51] 50)
"op ~:" :: "'a => 'a set => bool" ("op \<notin>")
"op ~:" :: "'a => 'a set => bool" ("(_/ \<notin> _)" [50, 51] 50)
"@UNION1" :: "pttrns => 'b set => 'b set" ("(3\<Union>_./ _)" 10)
"@INTER1" :: "pttrns => 'b set => 'b set" ("(3\<Inter>_./ _)" 10)
"@UNION" :: "pttrn => 'a set => 'b set => 'b set" ("(3\<Union>_\<in>_./ _)" 10)
"@INTER" :: "pttrn => 'a set => 'b set => 'b set" ("(3\<Inter>_\<in>_./ _)" 10)
Union :: "'a set set => 'a set" ("\<Union>_" [90] 90)
Inter :: "'a set set => 'a set" ("\<Inter>_" [90] 90)
"_Ball" :: "pttrn => 'a set => bool => bool" ("(3\<forall>_\<in>_./ _)" [0, 0, 10] 10)
"_Bex" :: "pttrn => 'a set => bool => bool" ("(3\<exists>_\<in>_./ _)" [0, 0, 10] 10)
translations
"op \<subseteq>" => "op <= :: _ set => _ set => bool"
"op \<subset>" => "op < :: _ set => _ set => bool"
typed_print_translation {*
let
fun le_tr' _ (Type ("fun", (Type ("set", _) :: _))) ts =
list_comb (Syntax.const "_setle", ts)
| le_tr' _ _ _ = raise Match;
fun less_tr' _ (Type ("fun", (Type ("set", _) :: _))) ts =
list_comb (Syntax.const "_setless", ts)
| less_tr' _ _ _ = raise Match;
in [("op <=", le_tr'), ("op <", less_tr')] end
*}
text {*
\medskip Translate between @{text "{e | x1...xn. P}"} and @{text
"{u. EX x1..xn. u = e & P}"}; @{text "{y. EX x1..xn. y = e & P}"} is
only translated if @{text "[0..n] subset bvs(e)"}.
*}
parse_translation {*
let
val ex_tr = snd (mk_binder_tr ("EX ", "Ex"));
fun nvars (Const ("_idts", _) $ _ $ idts) = nvars idts + 1
| nvars _ = 1;
fun setcompr_tr [e, idts, b] =
let
val eq = Syntax.const "op =" $ Bound (nvars idts) $ e;
val P = Syntax.const "op &" $ eq $ b;
val exP = ex_tr [idts, P];
in Syntax.const "Collect" $ Abs ("", dummyT, exP) end;
in [("@SetCompr", setcompr_tr)] end;
*}
(* To avoid eta-contraction of body: *)
print_translation {*
let
fun btr' syn [A,Abs abs] =
let val (x,t) = atomic_abs_tr' abs
in Syntax.const syn $ x $ A $ t end
in
[("Ball", btr' "_Ball"),("Bex", btr' "_Bex"),
("UNION", btr' "@UNION"),("INTER", btr' "@INTER")]
end
*}
print_translation {*
let
val ex_tr' = snd (mk_binder_tr' ("Ex", "DUMMY"));
fun setcompr_tr' [Abs (abs as (_, _, P))] =
let
fun check (Const ("Ex", _) $ Abs (_, _, P), n) = check (P, n + 1)
| check (Const ("op &", _) $ (Const ("op =", _) $ Bound m $ e) $ P, n) =
n > 0 andalso m = n andalso not (loose_bvar1 (P, n)) andalso
((0 upto (n - 1)) subset add_loose_bnos (e, 0, []))
| check _ = false
fun tr' (_ $ abs) =
let val _ $ idts $ (_ $ (_ $ _ $ e) $ Q) = ex_tr' [abs]
in Syntax.const "@SetCompr" $ e $ idts $ Q end;
in if check (P, 0) then tr' P
else let val (x,t) = atomic_abs_tr' abs
in Syntax.const "@Coll" $ x $ t end
end;
in [("Collect", setcompr_tr')] end;
*}
subsection {* Rules and definitions *}
text {* Isomorphisms between predicates and sets. *}
axioms
mem_Collect_eq [iff]: "(a : {x. P(x)}) = P(a)"
Collect_mem_eq [simp]: "{x. x:A} = A"
defs
Ball_def: "Ball A P == ALL x. x:A --> P(x)"
Bex_def: "Bex A P == EX x. x:A & P(x)"
defs (overloaded)
subset_def: "A <= B == ALL x:A. x:B"
psubset_def: "A < B == (A::'a set) <= B & ~ A=B"
Compl_def: "- A == {x. ~x:A}"
set_diff_def: "A - B == {x. x:A & ~x:B}"
defs
Un_def: "A Un B == {x. x:A | x:B}"
Int_def: "A Int B == {x. x:A & x:B}"
INTER_def: "INTER A B == {y. ALL x:A. y: B(x)}"
UNION_def: "UNION A B == {y. EX x:A. y: B(x)}"
Inter_def: "Inter S == (INT x:S. x)"
Union_def: "Union S == (UN x:S. x)"
Pow_def: "Pow A == {B. B <= A}"
empty_def: "{} == {x. False}"
UNIV_def: "UNIV == {x. True}"
insert_def: "insert a B == {x. x=a} Un B"
image_def: "f`A == {y. EX x:A. y = f(x)}"
subsection {* Lemmas and proof tool setup *}
subsubsection {* Relating predicates and sets *}
lemma CollectI: "P(a) ==> a : {x. P(x)}"
by simp
lemma CollectD: "a : {x. P(x)} ==> P(a)"
by simp
lemma Collect_cong: "(!!x. P x = Q x) ==> {x. P(x)} = {x. Q(x)}"
by simp
lemmas CollectE = CollectD [elim_format]
subsubsection {* Bounded quantifiers *}
lemma ballI [intro!]: "(!!x. x:A ==> P x) ==> ALL x:A. P x"
by (simp add: Ball_def)
lemmas strip = impI allI ballI
lemma bspec [dest?]: "ALL x:A. P x ==> x:A ==> P x"
by (simp add: Ball_def)
lemma ballE [elim]: "ALL x:A. P x ==> (P x ==> Q) ==> (x ~: A ==> Q) ==> Q"
by (unfold Ball_def) blast
ML {* bind_thm("rev_ballE",permute_prems 1 1 (thm "ballE")) *}
text {*
\medskip This tactic takes assumptions @{prop "ALL x:A. P x"} and
@{prop "a:A"}; creates assumption @{prop "P a"}.
*}
ML {*
local val ballE = thm "ballE"
in fun ball_tac i = etac ballE i THEN contr_tac (i + 1) end;
*}
text {*
Gives better instantiation for bound:
*}
ML_setup {*
claset_ref() := claset() addbefore ("bspec", datac (thm "bspec") 1);
*}
lemma bexI [intro]: "P x ==> x:A ==> EX x:A. P x"
-- {* Normally the best argument order: @{prop "P x"} constrains the
choice of @{prop "x:A"}. *}
by (unfold Bex_def) blast
lemma rev_bexI [intro?]: "x:A ==> P x ==> EX x:A. P x"
-- {* The best argument order when there is only one @{prop "x:A"}. *}
by (unfold Bex_def) blast
lemma bexCI: "(ALL x:A. ~P x ==> P a) ==> a:A ==> EX x:A. P x"
by (unfold Bex_def) blast
lemma bexE [elim!]: "EX x:A. P x ==> (!!x. x:A ==> P x ==> Q) ==> Q"
by (unfold Bex_def) blast
lemma ball_triv [simp]: "(ALL x:A. P) = ((EX x. x:A) --> P)"
-- {* Trival rewrite rule. *}
by (simp add: Ball_def)
lemma bex_triv [simp]: "(EX x:A. P) = ((EX x. x:A) & P)"
-- {* Dual form for existentials. *}
by (simp add: Bex_def)
lemma bex_triv_one_point1 [simp]: "(EX x:A. x = a) = (a:A)"
by blast
lemma bex_triv_one_point2 [simp]: "(EX x:A. a = x) = (a:A)"
by blast
lemma bex_one_point1 [simp]: "(EX x:A. x = a & P x) = (a:A & P a)"
by blast
lemma bex_one_point2 [simp]: "(EX x:A. a = x & P x) = (a:A & P a)"
by blast
lemma ball_one_point1 [simp]: "(ALL x:A. x = a --> P x) = (a:A --> P a)"
by blast
lemma ball_one_point2 [simp]: "(ALL x:A. a = x --> P x) = (a:A --> P a)"
by blast
ML_setup {*
local
val Ball_def = thm "Ball_def";
val Bex_def = thm "Bex_def";
val prove_bex_tac =
rewrite_goals_tac [Bex_def] THEN Quantifier1.prove_one_point_ex_tac;
val rearrange_bex = Quantifier1.rearrange_bex prove_bex_tac;
val prove_ball_tac =
rewrite_goals_tac [Ball_def] THEN Quantifier1.prove_one_point_all_tac;
val rearrange_ball = Quantifier1.rearrange_ball prove_ball_tac;
in
val defBEX_regroup = Simplifier.simproc (Theory.sign_of (the_context ()))
"defined BEX" ["EX x:A. P x & Q x"] rearrange_bex;
val defBALL_regroup = Simplifier.simproc (Theory.sign_of (the_context ()))
"defined BALL" ["ALL x:A. P x --> Q x"] rearrange_ball;
end;
Addsimprocs [defBALL_regroup, defBEX_regroup];
*}
subsubsection {* Congruence rules *}
lemma ball_cong [cong]:
"A = B ==> (!!x. x:B ==> P x = Q x) ==>
(ALL x:A. P x) = (ALL x:B. Q x)"
by (simp add: Ball_def)
lemma bex_cong [cong]:
"A = B ==> (!!x. x:B ==> P x = Q x) ==>
(EX x:A. P x) = (EX x:B. Q x)"
by (simp add: Bex_def cong: conj_cong)
subsubsection {* Subsets *}
lemma subsetI [intro!]: "(!!x. x:A ==> x:B) ==> A \<subseteq> B"
by (simp add: subset_def)
text {*
\medskip Map the type @{text "'a set => anything"} to just @{typ
'a}; for overloading constants whose first argument has type @{typ
"'a set"}.
*}
lemma subsetD [elim]: "A \<subseteq> B ==> c \<in> A ==> c \<in> B"
-- {* Rule in Modus Ponens style. *}
by (unfold subset_def) blast
declare subsetD [intro?] -- FIXME
lemma rev_subsetD: "c \<in> A ==> A \<subseteq> B ==> c \<in> B"
-- {* The same, with reversed premises for use with @{text erule} --
cf @{text rev_mp}. *}
by (rule subsetD)
declare rev_subsetD [intro?] -- FIXME
text {*
\medskip Converts @{prop "A \<subseteq> B"} to @{prop "x \<in> A ==> x \<in> B"}.
*}
ML {*
local val rev_subsetD = thm "rev_subsetD"
in fun impOfSubs th = th RSN (2, rev_subsetD) end;
*}
lemma subsetCE [elim]: "A \<subseteq> B ==> (c \<notin> A ==> P) ==> (c \<in> B ==> P) ==> P"
-- {* Classical elimination rule. *}
by (unfold subset_def) blast
text {*
\medskip Takes assumptions @{prop "A \<subseteq> B"}; @{prop "c \<in> A"} and
creates the assumption @{prop "c \<in> B"}.
*}
ML {*
local val subsetCE = thm "subsetCE"
in fun set_mp_tac i = etac subsetCE i THEN mp_tac i end;
*}
lemma contra_subsetD: "A \<subseteq> B ==> c \<notin> B ==> c \<notin> A"
by blast
lemma subset_refl: "A \<subseteq> A"
by fast
lemma subset_trans: "A \<subseteq> B ==> B \<subseteq> C ==> A \<subseteq> C"
by blast
subsubsection {* Equality *}
lemma set_ext: assumes prem: "(!!x. (x:A) = (x:B))" shows "A = B"
apply (rule prem [THEN ext, THEN arg_cong, THEN box_equals])
apply (rule Collect_mem_eq)
apply (rule Collect_mem_eq)
done
lemma subset_antisym [intro!]: "A \<subseteq> B ==> B \<subseteq> A ==> A = B"
-- {* Anti-symmetry of the subset relation. *}
by (rules intro: set_ext subsetD)
lemmas equalityI [intro!] = subset_antisym
text {*
\medskip Equality rules from ZF set theory -- are they appropriate
here?
*}
lemma equalityD1: "A = B ==> A \<subseteq> B"
by (simp add: subset_refl)
lemma equalityD2: "A = B ==> B \<subseteq> A"
by (simp add: subset_refl)
text {*
\medskip Be careful when adding this to the claset as @{text
subset_empty} is in the simpset: @{prop "A = {}"} goes to @{prop "{}
\<subseteq> A"} and @{prop "A \<subseteq> {}"} and then back to @{prop "A = {}"}!
*}
lemma equalityE: "A = B ==> (A \<subseteq> B ==> B \<subseteq> A ==> P) ==> P"
by (simp add: subset_refl)
lemma equalityCE [elim]:
"A = B ==> (c \<in> A ==> c \<in> B ==> P) ==> (c \<notin> A ==> c \<notin> B ==> P) ==> P"
by blast
text {*
\medskip Lemma for creating induction formulae -- for "pattern
matching" on @{text p}. To make the induction hypotheses usable,
apply @{text spec} or @{text bspec} to put universal quantifiers over the free
variables in @{text p}.
*}
lemma setup_induction: "p:A ==> (!!z. z:A ==> p = z --> R) ==> R"
by simp
lemma eqset_imp_iff: "A = B ==> (x : A) = (x : B)"
by simp
lemma eqelem_imp_iff: "x = y ==> (x : A) = (y : A)"
by simp
subsubsection {* The universal set -- UNIV *}
lemma UNIV_I [simp]: "x : UNIV"
by (simp add: UNIV_def)
declare UNIV_I [intro] -- {* unsafe makes it less likely to cause problems *}
lemma UNIV_witness [intro?]: "EX x. x : UNIV"
by simp
lemma subset_UNIV: "A \<subseteq> UNIV"
by (rule subsetI) (rule UNIV_I)
text {*
\medskip Eta-contracting these two rules (to remove @{text P})
causes them to be ignored because of their interaction with
congruence rules.
*}
lemma ball_UNIV [simp]: "Ball UNIV P = All P"
by (simp add: Ball_def)
lemma bex_UNIV [simp]: "Bex UNIV P = Ex P"
by (simp add: Bex_def)
subsubsection {* The empty set *}
lemma empty_iff [simp]: "(c : {}) = False"
by (simp add: empty_def)
lemma emptyE [elim!]: "a : {} ==> P"
by simp
lemma empty_subsetI [iff]: "{} \<subseteq> A"
-- {* One effect is to delete the ASSUMPTION @{prop "{} <= A"} *}
by blast
lemma equals0I: "(!!y. y \<in> A ==> False) ==> A = {}"
by blast
lemma equals0D: "A = {} ==> a \<notin> A"
-- {* Use for reasoning about disjointness: @{prop "A Int B = {}"} *}
by blast
lemma ball_empty [simp]: "Ball {} P = True"
by (simp add: Ball_def)
lemma bex_empty [simp]: "Bex {} P = False"
by (simp add: Bex_def)
lemma UNIV_not_empty [iff]: "UNIV ~= {}"
by (blast elim: equalityE)
subsubsection {* The Powerset operator -- Pow *}
lemma Pow_iff [iff]: "(A \<in> Pow B) = (A \<subseteq> B)"
by (simp add: Pow_def)
lemma PowI: "A \<subseteq> B ==> A \<in> Pow B"
by (simp add: Pow_def)
lemma PowD: "A \<in> Pow B ==> A \<subseteq> B"
by (simp add: Pow_def)
lemma Pow_bottom: "{} \<in> Pow B"
by simp
lemma Pow_top: "A \<in> Pow A"
by (simp add: subset_refl)
subsubsection {* Set complement *}
lemma Compl_iff [simp]: "(c \<in> -A) = (c \<notin> A)"
by (unfold Compl_def) blast
lemma ComplI [intro!]: "(c \<in> A ==> False) ==> c \<in> -A"
by (unfold Compl_def) blast
text {*
\medskip This form, with negated conclusion, works well with the
Classical prover. Negated assumptions behave like formulae on the
right side of the notional turnstile ... *}
lemma ComplD: "c : -A ==> c~:A"
by (unfold Compl_def) blast
lemmas ComplE [elim!] = ComplD [elim_format]
subsubsection {* Binary union -- Un *}
lemma Un_iff [simp]: "(c : A Un B) = (c:A | c:B)"
by (unfold Un_def) blast
lemma UnI1 [elim?]: "c:A ==> c : A Un B"
by simp
lemma UnI2 [elim?]: "c:B ==> c : A Un B"
by simp
text {*
\medskip Classical introduction rule: no commitment to @{prop A} vs
@{prop B}.
*}
lemma UnCI [intro!]: "(c~:B ==> c:A) ==> c : A Un B"
by auto
lemma UnE [elim!]: "c : A Un B ==> (c:A ==> P) ==> (c:B ==> P) ==> P"
by (unfold Un_def) blast
subsubsection {* Binary intersection -- Int *}
lemma Int_iff [simp]: "(c : A Int B) = (c:A & c:B)"
by (unfold Int_def) blast
lemma IntI [intro!]: "c:A ==> c:B ==> c : A Int B"
by simp
lemma IntD1: "c : A Int B ==> c:A"
by simp
lemma IntD2: "c : A Int B ==> c:B"
by simp
lemma IntE [elim!]: "c : A Int B ==> (c:A ==> c:B ==> P) ==> P"
by simp
subsubsection {* Set difference *}
lemma Diff_iff [simp]: "(c : A - B) = (c:A & c~:B)"
by (unfold set_diff_def) blast
lemma DiffI [intro!]: "c : A ==> c ~: B ==> c : A - B"
by simp
lemma DiffD1: "c : A - B ==> c : A"
by simp
lemma DiffD2: "c : A - B ==> c : B ==> P"
by simp
lemma DiffE [elim!]: "c : A - B ==> (c:A ==> c~:B ==> P) ==> P"
by simp
subsubsection {* Augmenting a set -- insert *}
lemma insert_iff [simp]: "(a : insert b A) = (a = b | a:A)"
by (unfold insert_def) blast
lemma insertI1: "a : insert a B"
by simp
lemma insertI2: "a : B ==> a : insert b B"
by simp
lemma insertE [elim!]: "a : insert b A ==> (a = b ==> P) ==> (a:A ==> P) ==> P"
by (unfold insert_def) blast
lemma insertCI [intro!]: "(a~:B ==> a = b) ==> a: insert b B"
-- {* Classical introduction rule. *}
by auto
lemma subset_insert_iff: "(A \<subseteq> insert x B) = (if x:A then A - {x} \<subseteq> B else A \<subseteq> B)"
by auto
subsubsection {* Singletons, using insert *}
lemma singletonI [intro!]: "a : {a}"
-- {* Redundant? But unlike @{text insertCI}, it proves the subgoal immediately! *}
by (rule insertI1)
lemma singletonD: "b : {a} ==> b = a"
by blast
lemmas singletonE [elim!] = singletonD [elim_format]
lemma singleton_iff: "(b : {a}) = (b = a)"
by blast
lemma singleton_inject [dest!]: "{a} = {b} ==> a = b"
by blast
lemma singleton_insert_inj_eq [iff]: "({b} = insert a A) = (a = b & A \<subseteq> {b})"
by blast
lemma singleton_insert_inj_eq' [iff]: "(insert a A = {b}) = (a = b & A \<subseteq> {b})"
by blast
lemma subset_singletonD: "A \<subseteq> {x} ==> A = {} | A = {x}"
by fast
lemma singleton_conv [simp]: "{x. x = a} = {a}"
by blast
lemma singleton_conv2 [simp]: "{x. a = x} = {a}"
by blast
lemma diff_single_insert: "A - {x} \<subseteq> B ==> x \<in> A ==> A \<subseteq> insert x B"
by blast
subsubsection {* Unions of families *}
text {*
@{term [source] "UN x:A. B x"} is @{term "Union (B`A)"}.
*}
lemma UN_iff [simp]: "(b: (UN x:A. B x)) = (EX x:A. b: B x)"
by (unfold UNION_def) blast
lemma UN_I [intro]: "a:A ==> b: B a ==> b: (UN x:A. B x)"
-- {* The order of the premises presupposes that @{term A} is rigid;
@{term b} may be flexible. *}
by auto
lemma UN_E [elim!]: "b : (UN x:A. B x) ==> (!!x. x:A ==> b: B x ==> R) ==> R"
by (unfold UNION_def) blast
lemma UN_cong [cong]:
"A = B ==> (!!x. x:B ==> C x = D x) ==> (UN x:A. C x) = (UN x:B. D x)"
by (simp add: UNION_def)
subsubsection {* Intersections of families *}
text {* @{term [source] "INT x:A. B x"} is @{term "Inter (B`A)"}. *}
lemma INT_iff [simp]: "(b: (INT x:A. B x)) = (ALL x:A. b: B x)"
by (unfold INTER_def) blast
lemma INT_I [intro!]: "(!!x. x:A ==> b: B x) ==> b : (INT x:A. B x)"
by (unfold INTER_def) blast
lemma INT_D [elim]: "b : (INT x:A. B x) ==> a:A ==> b: B a"
by auto
lemma INT_E [elim]: "b : (INT x:A. B x) ==> (b: B a ==> R) ==> (a~:A ==> R) ==> R"
-- {* "Classical" elimination -- by the Excluded Middle on @{prop "a:A"}. *}
by (unfold INTER_def) blast
lemma INT_cong [cong]:
"A = B ==> (!!x. x:B ==> C x = D x) ==> (INT x:A. C x) = (INT x:B. D x)"
by (simp add: INTER_def)
subsubsection {* Union *}
lemma Union_iff [simp]: "(A : Union C) = (EX X:C. A:X)"
by (unfold Union_def) blast
lemma UnionI [intro]: "X:C ==> A:X ==> A : Union C"
-- {* The order of the premises presupposes that @{term C} is rigid;
@{term A} may be flexible. *}
by auto
lemma UnionE [elim!]: "A : Union C ==> (!!X. A:X ==> X:C ==> R) ==> R"
by (unfold Union_def) blast
subsubsection {* Inter *}
lemma Inter_iff [simp]: "(A : Inter C) = (ALL X:C. A:X)"
by (unfold Inter_def) blast
lemma InterI [intro!]: "(!!X. X:C ==> A:X) ==> A : Inter C"
by (simp add: Inter_def)
text {*
\medskip A ``destruct'' rule -- every @{term X} in @{term C}
contains @{term A} as an element, but @{prop "A:X"} can hold when
@{prop "X:C"} does not! This rule is analogous to @{text spec}.
*}
lemma InterD [elim]: "A : Inter C ==> X:C ==> A:X"
by auto
lemma InterE [elim]: "A : Inter C ==> (X~:C ==> R) ==> (A:X ==> R) ==> R"
-- {* ``Classical'' elimination rule -- does not require proving
@{prop "X:C"}. *}
by (unfold Inter_def) blast
text {*
\medskip Image of a set under a function. Frequently @{term b} does
not have the syntactic form of @{term "f x"}.
*}
lemma image_eqI [simp, intro]: "b = f x ==> x:A ==> b : f`A"
by (unfold image_def) blast
lemma imageI: "x : A ==> f x : f ` A"
by (rule image_eqI) (rule refl)
lemma rev_image_eqI: "x:A ==> b = f x ==> b : f`A"
-- {* This version's more effective when we already have the
required @{term x}. *}
by (unfold image_def) blast
lemma imageE [elim!]:
"b : (%x. f x)`A ==> (!!x. b = f x ==> x:A ==> P) ==> P"
-- {* The eta-expansion gives variable-name preservation. *}
by (unfold image_def) blast
lemma image_Un: "f`(A Un B) = f`A Un f`B"
by blast
lemma image_iff: "(z : f`A) = (EX x:A. z = f x)"
by blast
lemma image_subset_iff: "(f`A \<subseteq> B) = (\<forall>x\<in>A. f x \<in> B)"
-- {* This rewrite rule would confuse users if made default. *}
by blast
lemma subset_image_iff: "(B \<subseteq> f`A) = (EX AA. AA \<subseteq> A & B = f`AA)"
apply safe
prefer 2 apply fast
apply (rule_tac x = "{a. a : A & f a : B}" in exI, fast)
done
lemma image_subsetI: "(!!x. x \<in> A ==> f x \<in> B) ==> f`A \<subseteq> B"
-- {* Replaces the three steps @{text subsetI}, @{text imageE},
@{text hypsubst}, but breaks too many existing proofs. *}
by blast
text {*
\medskip Range of a function -- just a translation for image!
*}
lemma range_eqI: "b = f x ==> b \<in> range f"
by simp
lemma rangeI: "f x \<in> range f"
by simp
lemma rangeE [elim?]: "b \<in> range (\<lambda>x. f x) ==> (!!x. b = f x ==> P) ==> P"
by blast
subsubsection {* Set reasoning tools *}
text {*
Rewrite rules for boolean case-splitting: faster than @{text
"split_if [split]"}.
*}
lemma split_if_eq1: "((if Q then x else y) = b) = ((Q --> x = b) & (~ Q --> y = b))"
by (rule split_if)
lemma split_if_eq2: "(a = (if Q then x else y)) = ((Q --> a = x) & (~ Q --> a = y))"
by (rule split_if)
text {*
Split ifs on either side of the membership relation. Not for @{text
"[simp]"} -- can cause goals to blow up!
*}
lemma split_if_mem1: "((if Q then x else y) : b) = ((Q --> x : b) & (~ Q --> y : b))"
by (rule split_if)
lemma split_if_mem2: "(a : (if Q then x else y)) = ((Q --> a : x) & (~ Q --> a : y))"
by (rule split_if)
lemmas split_ifs = if_bool_eq_conj split_if_eq1 split_if_eq2 split_if_mem1 split_if_mem2
lemmas mem_simps =
insert_iff empty_iff Un_iff Int_iff Compl_iff Diff_iff
mem_Collect_eq UN_iff Union_iff INT_iff Inter_iff
-- {* Each of these has ALREADY been added @{text "[simp]"} above. *}
(*Would like to add these, but the existing code only searches for the
outer-level constant, which in this case is just "op :"; we instead need
to use term-nets to associate patterns with rules. Also, if a rule fails to
apply, then the formula should be kept.
[("uminus", Compl_iff RS iffD1), ("op -", [Diff_iff RS iffD1]),
("op Int", [IntD1,IntD2]),
("Collect", [CollectD]), ("Inter", [InterD]), ("INTER", [INT_D])]
*)
ML_setup {*
val mksimps_pairs = [("Ball", [thm "bspec"])] @ mksimps_pairs;
simpset_ref() := simpset() setmksimps (mksimps mksimps_pairs);
*}
declare subset_UNIV [simp] subset_refl [simp]
subsubsection {* The ``proper subset'' relation *}
lemma psubsetI [intro!]: "A \<subseteq> B ==> A \<noteq> B ==> A \<subset> B"
by (unfold psubset_def) blast
lemma psubsetE [elim!]:
"[|A \<subset> B; [|A \<subseteq> B; ~ (B\<subseteq>A)|] ==> R|] ==> R"
by (unfold psubset_def) blast
lemma psubset_insert_iff:
"(A \<subset> insert x B) = (if x \<in> B then A \<subset> B else if x \<in> A then A - {x} \<subset> B else A \<subseteq> B)"
by (auto simp add: psubset_def subset_insert_iff)
lemma psubset_eq: "(A \<subset> B) = (A \<subseteq> B & A \<noteq> B)"
by (simp only: psubset_def)
lemma psubset_imp_subset: "A \<subset> B ==> A \<subseteq> B"
by (simp add: psubset_eq)
lemma psubset_subset_trans: "A \<subset> B ==> B \<subseteq> C ==> A \<subset> C"
by (auto simp add: psubset_eq)
lemma subset_psubset_trans: "A \<subseteq> B ==> B \<subset> C ==> A \<subset> C"
by (auto simp add: psubset_eq)
lemma psubset_imp_ex_mem: "A \<subset> B ==> \<exists>b. b \<in> (B - A)"
by (unfold psubset_def) blast
lemma atomize_ball:
"(!!x. x \<in> A ==> P x) == Trueprop (\<forall>x\<in>A. P x)"
by (simp only: Ball_def atomize_all atomize_imp)
declare atomize_ball [symmetric, rulify]
subsection {* Further set-theory lemmas *}
subsubsection {* Derived rules involving subsets. *}
text {* @{text insert}. *}
lemma subset_insertI: "B \<subseteq> insert a B"
apply (rule subsetI)
apply (erule insertI2)
done
lemma subset_insertI2: "A \<subseteq> B \<Longrightarrow> A \<subseteq> insert b B"
by blast
lemma subset_insert: "x \<notin> A ==> (A \<subseteq> insert x B) = (A \<subseteq> B)"
by blast
text {* \medskip Big Union -- least upper bound of a set. *}
lemma Union_upper: "B \<in> A ==> B \<subseteq> Union A"
by (rules intro: subsetI UnionI)
lemma Union_least: "(!!X. X \<in> A ==> X \<subseteq> C) ==> Union A \<subseteq> C"
by (rules intro: subsetI elim: UnionE dest: subsetD)
text {* \medskip General union. *}
lemma UN_upper: "a \<in> A ==> B a \<subseteq> (\<Union>x\<in>A. B x)"
by blast
lemma UN_least: "(!!x. x \<in> A ==> B x \<subseteq> C) ==> (\<Union>x\<in>A. B x) \<subseteq> C"
by (rules intro: subsetI elim: UN_E dest: subsetD)
text {* \medskip Big Intersection -- greatest lower bound of a set. *}
lemma Inter_lower: "B \<in> A ==> Inter A \<subseteq> B"
by blast
lemma Inter_greatest: "(!!X. X \<in> A ==> C \<subseteq> X) ==> C \<subseteq> Inter A"
by (rules intro: InterI subsetI dest: subsetD)
lemma INT_lower: "a \<in> A ==> (\<Inter>x\<in>A. B x) \<subseteq> B a"
by blast
lemma INT_greatest: "(!!x. x \<in> A ==> C \<subseteq> B x) ==> C \<subseteq> (\<Inter>x\<in>A. B x)"
by (rules intro: INT_I subsetI dest: subsetD)
text {* \medskip Finite Union -- the least upper bound of two sets. *}
lemma Un_upper1: "A \<subseteq> A \<union> B"
by blast
lemma Un_upper2: "B \<subseteq> A \<union> B"
by blast
lemma Un_least: "A \<subseteq> C ==> B \<subseteq> C ==> A \<union> B \<subseteq> C"
by blast
text {* \medskip Finite Intersection -- the greatest lower bound of two sets. *}
lemma Int_lower1: "A \<inter> B \<subseteq> A"
by blast
lemma Int_lower2: "A \<inter> B \<subseteq> B"
by blast
lemma Int_greatest: "C \<subseteq> A ==> C \<subseteq> B ==> C \<subseteq> A \<inter> B"
by blast
text {* \medskip Set difference. *}
lemma Diff_subset: "A - B \<subseteq> A"
by blast
lemma Diff_subset_conv: "(A - B \<subseteq> C) = (A \<subseteq> B \<union> C)"
by blast
text {* \medskip Monotonicity. *}
lemma mono_Un: includes mono shows "f A \<union> f B \<subseteq> f (A \<union> B)"
apply (rule Un_least)
apply (rule Un_upper1 [THEN mono])
apply (rule Un_upper2 [THEN mono])
done
lemma mono_Int: includes mono shows "f (A \<inter> B) \<subseteq> f A \<inter> f B"
apply (rule Int_greatest)
apply (rule Int_lower1 [THEN mono])
apply (rule Int_lower2 [THEN mono])
done
subsubsection {* Equalities involving union, intersection, inclusion, etc. *}
text {* @{text "{}"}. *}
lemma Collect_const [simp]: "{s. P} = (if P then UNIV else {})"
-- {* supersedes @{text "Collect_False_empty"} *}
by auto
lemma subset_empty [simp]: "(A \<subseteq> {}) = (A = {})"
by blast
lemma not_psubset_empty [iff]: "\<not> (A < {})"
by (unfold psubset_def) blast
lemma Collect_empty_eq [simp]: "(Collect P = {}) = (\<forall>x. \<not> P x)"
by auto
lemma Collect_neg_eq: "{x. \<not> P x} = - {x. P x}"
by blast
lemma Collect_disj_eq: "{x. P x | Q x} = {x. P x} \<union> {x. Q x}"
by blast
lemma Collect_conj_eq: "{x. P x & Q x} = {x. P x} \<inter> {x. Q x}"
by blast
lemma Collect_all_eq: "{x. \<forall>y. P x y} = (\<Inter>y. {x. P x y})"
by blast
lemma Collect_ball_eq: "{x. \<forall>y\<in>A. P x y} = (\<Inter>y\<in>A. {x. P x y})"
by blast
lemma Collect_ex_eq: "{x. \<exists>y. P x y} = (\<Union>y. {x. P x y})"
by blast
lemma Collect_bex_eq: "{x. \<exists>y\<in>A. P x y} = (\<Union>y\<in>A. {x. P x y})"
by blast
text {* \medskip @{text insert}. *}
lemma insert_is_Un: "insert a A = {a} Un A"
-- {* NOT SUITABLE FOR REWRITING since @{text "{a} == insert a {}"} *}
by blast
lemma insert_not_empty [simp]: "insert a A \<noteq> {}"
by blast
lemmas empty_not_insert [simp] = insert_not_empty [symmetric, standard]
lemma insert_absorb: "a \<in> A ==> insert a A = A"
-- {* @{text "[simp]"} causes recursive calls when there are nested inserts *}
-- {* with \emph{quadratic} running time *}
by blast
lemma insert_absorb2 [simp]: "insert x (insert x A) = insert x A"
by blast
lemma insert_commute: "insert x (insert y A) = insert y (insert x A)"
by blast
lemma insert_subset [simp]: "(insert x A \<subseteq> B) = (x \<in> B & A \<subseteq> B)"
by blast
lemma mk_disjoint_insert: "a \<in> A ==> \<exists>B. A = insert a B & a \<notin> B"
-- {* use new @{text B} rather than @{text "A - {a}"} to avoid infinite unfolding *}
apply (rule_tac x = "A - {a}" in exI, blast)
done
lemma insert_Collect: "insert a (Collect P) = {u. u \<noteq> a --> P u}"
by auto
lemma UN_insert_distrib: "u \<in> A ==> (\<Union>x\<in>A. insert a (B x)) = insert a (\<Union>x\<in>A. B x)"
by blast
lemma insert_inter_insert[simp]: "insert a A \<inter> insert a B = insert a (A \<inter> B)"
by blast
lemma insert_disjoint[simp]:
"(insert a A \<inter> B = {}) = (a \<notin> B \<and> A \<inter> B = {})"
by blast
lemma disjoint_insert[simp]:
"(B \<inter> insert a A = {}) = (a \<notin> B \<and> B \<inter> A = {})"
by blast
text {* \medskip @{text image}. *}
lemma image_empty [simp]: "f`{} = {}"
by blast
lemma image_insert [simp]: "f ` insert a B = insert (f a) (f`B)"
by blast
lemma image_constant: "x \<in> A ==> (\<lambda>x. c) ` A = {c}"
by blast
lemma image_image: "f ` (g ` A) = (\<lambda>x. f (g x)) ` A"
by blast
lemma insert_image [simp]: "x \<in> A ==> insert (f x) (f`A) = f`A"
by blast
lemma image_is_empty [iff]: "(f`A = {}) = (A = {})"
by blast
lemma image_Collect: "f ` {x. P x} = {f x | x. P x}"
-- {* NOT suitable as a default simprule: the RHS isn't simpler than the LHS, *}
-- {* with its implicit quantifier and conjunction. Also image enjoys better *}
-- {* equational properties than does the RHS. *}
by blast
lemma if_image_distrib [simp]:
"(\<lambda>x. if P x then f x else g x) ` S
= (f ` (S \<inter> {x. P x})) \<union> (g ` (S \<inter> {x. \<not> P x}))"
by (auto simp add: image_def)
lemma image_cong: "M = N ==> (!!x. x \<in> N ==> f x = g x) ==> f`M = g`N"
by (simp add: image_def)
text {* \medskip @{text range}. *}
lemma full_SetCompr_eq: "{u. \<exists>x. u = f x} = range f"
by auto
lemma range_composition [simp]: "range (\<lambda>x. f (g x)) = f`range g"
by (subst image_image, simp)
text {* \medskip @{text Int} *}
lemma Int_absorb [simp]: "A \<inter> A = A"
by blast
lemma Int_left_absorb: "A \<inter> (A \<inter> B) = A \<inter> B"
by blast
lemma Int_commute: "A \<inter> B = B \<inter> A"
by blast
lemma Int_left_commute: "A \<inter> (B \<inter> C) = B \<inter> (A \<inter> C)"
by blast
lemma Int_assoc: "(A \<inter> B) \<inter> C = A \<inter> (B \<inter> C)"
by blast
lemmas Int_ac = Int_assoc Int_left_absorb Int_commute Int_left_commute
-- {* Intersection is an AC-operator *}
lemma Int_absorb1: "B \<subseteq> A ==> A \<inter> B = B"
by blast
lemma Int_absorb2: "A \<subseteq> B ==> A \<inter> B = A"
by blast
lemma Int_empty_left [simp]: "{} \<inter> B = {}"
by blast
lemma Int_empty_right [simp]: "A \<inter> {} = {}"
by blast
lemma disjoint_eq_subset_Compl: "(A \<inter> B = {}) = (A \<subseteq> -B)"
by blast
lemma disjoint_iff_not_equal: "(A \<inter> B = {}) = (\<forall>x\<in>A. \<forall>y\<in>B. x \<noteq> y)"
by blast
lemma Int_UNIV_left [simp]: "UNIV \<inter> B = B"
by blast
lemma Int_UNIV_right [simp]: "A \<inter> UNIV = A"
by blast
lemma Int_eq_Inter: "A \<inter> B = \<Inter>{A, B}"
by blast
lemma Int_Un_distrib: "A \<inter> (B \<union> C) = (A \<inter> B) \<union> (A \<inter> C)"
by blast
lemma Int_Un_distrib2: "(B \<union> C) \<inter> A = (B \<inter> A) \<union> (C \<inter> A)"
by blast
lemma Int_UNIV [simp]: "(A \<inter> B = UNIV) = (A = UNIV & B = UNIV)"
by blast
lemma Int_subset_iff: "(C \<subseteq> A \<inter> B) = (C \<subseteq> A & C \<subseteq> B)"
by blast
lemma Int_Collect: "(x \<in> A \<inter> {x. P x}) = (x \<in> A & P x)"
by blast
text {* \medskip @{text Un}. *}
lemma Un_absorb [simp]: "A \<union> A = A"
by blast
lemma Un_left_absorb: "A \<union> (A \<union> B) = A \<union> B"
by blast
lemma Un_commute: "A \<union> B = B \<union> A"
by blast
lemma Un_left_commute: "A \<union> (B \<union> C) = B \<union> (A \<union> C)"
by blast
lemma Un_assoc: "(A \<union> B) \<union> C = A \<union> (B \<union> C)"
by blast
lemmas Un_ac = Un_assoc Un_left_absorb Un_commute Un_left_commute
-- {* Union is an AC-operator *}
lemma Un_absorb1: "A \<subseteq> B ==> A \<union> B = B"
by blast
lemma Un_absorb2: "B \<subseteq> A ==> A \<union> B = A"
by blast
lemma Un_empty_left [simp]: "{} \<union> B = B"
by blast
lemma Un_empty_right [simp]: "A \<union> {} = A"
by blast
lemma Un_UNIV_left [simp]: "UNIV \<union> B = UNIV"
by blast
lemma Un_UNIV_right [simp]: "A \<union> UNIV = UNIV"
by blast
lemma Un_eq_Union: "A \<union> B = \<Union>{A, B}"
by blast
lemma Un_insert_left [simp]: "(insert a B) \<union> C = insert a (B \<union> C)"
by blast
lemma Un_insert_right [simp]: "A \<union> (insert a B) = insert a (A \<union> B)"
by blast
lemma Int_insert_left:
"(insert a B) Int C = (if a \<in> C then insert a (B \<inter> C) else B \<inter> C)"
by auto
lemma Int_insert_right:
"A \<inter> (insert a B) = (if a \<in> A then insert a (A \<inter> B) else A \<inter> B)"
by auto
lemma Un_Int_distrib: "A \<union> (B \<inter> C) = (A \<union> B) \<inter> (A \<union> C)"
by blast
lemma Un_Int_distrib2: "(B \<inter> C) \<union> A = (B \<union> A) \<inter> (C \<union> A)"
by blast
lemma Un_Int_crazy:
"(A \<inter> B) \<union> (B \<inter> C) \<union> (C \<inter> A) = (A \<union> B) \<inter> (B \<union> C) \<inter> (C \<union> A)"
by blast
lemma subset_Un_eq: "(A \<subseteq> B) = (A \<union> B = B)"
by blast
lemma Un_empty [iff]: "(A \<union> B = {}) = (A = {} & B = {})"
by blast
lemma Un_subset_iff: "(A \<union> B \<subseteq> C) = (A \<subseteq> C & B \<subseteq> C)"
by blast
lemma Un_Diff_Int: "(A - B) \<union> (A \<inter> B) = A"
by blast
text {* \medskip Set complement *}
lemma Compl_disjoint [simp]: "A \<inter> -A = {}"
by blast
lemma Compl_disjoint2 [simp]: "-A \<inter> A = {}"
by blast
lemma Compl_partition: "A \<union> -A = UNIV"
by blast
lemma Compl_partition2: "-A \<union> A = UNIV"
by blast
lemma double_complement [simp]: "- (-A) = (A::'a set)"
by blast
lemma Compl_Un [simp]: "-(A \<union> B) = (-A) \<inter> (-B)"
by blast
lemma Compl_Int [simp]: "-(A \<inter> B) = (-A) \<union> (-B)"
by blast
lemma Compl_UN [simp]: "-(\<Union>x\<in>A. B x) = (\<Inter>x\<in>A. -B x)"
by blast
lemma Compl_INT [simp]: "-(\<Inter>x\<in>A. B x) = (\<Union>x\<in>A. -B x)"
by blast
lemma subset_Compl_self_eq: "(A \<subseteq> -A) = (A = {})"
by blast
lemma Un_Int_assoc_eq: "((A \<inter> B) \<union> C = A \<inter> (B \<union> C)) = (C \<subseteq> A)"
-- {* Halmos, Naive Set Theory, page 16. *}
by blast
lemma Compl_UNIV_eq [simp]: "-UNIV = {}"
by blast
lemma Compl_empty_eq [simp]: "-{} = UNIV"
by blast
lemma Compl_subset_Compl_iff [iff]: "(-A \<subseteq> -B) = (B \<subseteq> A)"
by blast
lemma Compl_eq_Compl_iff [iff]: "(-A = -B) = (A = (B::'a set))"
by blast
text {* \medskip @{text Union}. *}
lemma Union_empty [simp]: "Union({}) = {}"
by blast
lemma Union_UNIV [simp]: "Union UNIV = UNIV"
by blast
lemma Union_insert [simp]: "Union (insert a B) = a \<union> \<Union>B"
by blast
lemma Union_Un_distrib [simp]: "\<Union>(A Un B) = \<Union>A \<union> \<Union>B"
by blast
lemma Union_Int_subset: "\<Union>(A \<inter> B) \<subseteq> \<Union>A \<inter> \<Union>B"
by blast
lemma Union_empty_conv [iff]: "(\<Union>A = {}) = (\<forall>x\<in>A. x = {})"
by blast
lemma empty_Union_conv [iff]: "({} = \<Union>A) = (\<forall>x\<in>A. x = {})"
by blast
lemma Union_disjoint: "(\<Union>C \<inter> A = {}) = (\<forall>B\<in>C. B \<inter> A = {})"
by blast
text {* \medskip @{text Inter}. *}
lemma Inter_empty [simp]: "\<Inter>{} = UNIV"
by blast
lemma Inter_UNIV [simp]: "\<Inter>UNIV = {}"
by blast
lemma Inter_insert [simp]: "\<Inter>(insert a B) = a \<inter> \<Inter>B"
by blast
lemma Inter_Un_subset: "\<Inter>A \<union> \<Inter>B \<subseteq> \<Inter>(A \<inter> B)"
by blast
lemma Inter_Un_distrib: "\<Inter>(A \<union> B) = \<Inter>A \<inter> \<Inter>B"
by blast
lemma Inter_UNIV_conv [iff]:
"(\<Inter>A = UNIV) = (\<forall>x\<in>A. x = UNIV)"
"(UNIV = \<Inter>A) = (\<forall>x\<in>A. x = UNIV)"
by blast+
text {*
\medskip @{text UN} and @{text INT}.
Basic identities: *}
lemma UN_empty [simp]: "(\<Union>x\<in>{}. B x) = {}"
by blast
lemma UN_empty2 [simp]: "(\<Union>x\<in>A. {}) = {}"
by blast
lemma UN_singleton [simp]: "(\<Union>x\<in>A. {x}) = A"
by blast
lemma UN_absorb: "k \<in> I ==> A k \<union> (\<Union>i\<in>I. A i) = (\<Union>i\<in>I. A i)"
by blast
lemma INT_empty [simp]: "(\<Inter>x\<in>{}. B x) = UNIV"
by blast
lemma INT_absorb: "k \<in> I ==> A k \<inter> (\<Inter>i\<in>I. A i) = (\<Inter>i\<in>I. A i)"
by blast
lemma UN_insert [simp]: "(\<Union>x\<in>insert a A. B x) = B a \<union> UNION A B"
by blast
lemma UN_Un: "(\<Union>i \<in> A \<union> B. M i) = (\<Union>i\<in>A. M i) \<union> (\<Union>i\<in>B. M i)"
by blast
lemma UN_UN_flatten: "(\<Union>x \<in> (\<Union>y\<in>A. B y). C x) = (\<Union>y\<in>A. \<Union>x\<in>B y. C x)"
by blast
lemma UN_subset_iff: "((\<Union>i\<in>I. A i) \<subseteq> B) = (\<forall>i\<in>I. A i \<subseteq> B)"
by blast
lemma INT_subset_iff: "(B \<subseteq> (\<Inter>i\<in>I. A i)) = (\<forall>i\<in>I. B \<subseteq> A i)"
by blast
lemma INT_insert [simp]: "(\<Inter>x \<in> insert a A. B x) = B a \<inter> INTER A B"
by blast
lemma INT_Un: "(\<Inter>i \<in> A \<union> B. M i) = (\<Inter>i \<in> A. M i) \<inter> (\<Inter>i\<in>B. M i)"
by blast
lemma INT_insert_distrib:
"u \<in> A ==> (\<Inter>x\<in>A. insert a (B x)) = insert a (\<Inter>x\<in>A. B x)"
by blast
lemma Union_image_eq [simp]: "\<Union>(B`A) = (\<Union>x\<in>A. B x)"
by blast
lemma image_Union: "f ` \<Union>S = (\<Union>x\<in>S. f ` x)"
by blast
lemma Inter_image_eq [simp]: "\<Inter>(B`A) = (\<Inter>x\<in>A. B x)"
by blast
lemma UN_constant [simp]: "(\<Union>y\<in>A. c) = (if A = {} then {} else c)"
by auto
lemma INT_constant [simp]: "(\<Inter>y\<in>A. c) = (if A = {} then UNIV else c)"
by auto
lemma UN_eq: "(\<Union>x\<in>A. B x) = \<Union>({Y. \<exists>x\<in>A. Y = B x})"
by blast
lemma INT_eq: "(\<Inter>x\<in>A. B x) = \<Inter>({Y. \<exists>x\<in>A. Y = B x})"
-- {* Look: it has an \emph{existential} quantifier *}
by blast
lemma UNION_empty_conv[iff]:
"({} = (UN x:A. B x)) = (\<forall>x\<in>A. B x = {})"
"((UN x:A. B x) = {}) = (\<forall>x\<in>A. B x = {})"
by blast+
lemma INTER_UNIV_conv[iff]:
"(UNIV = (INT x:A. B x)) = (\<forall>x\<in>A. B x = UNIV)"
"((INT x:A. B x) = UNIV) = (\<forall>x\<in>A. B x = UNIV)"
by blast+
text {* \medskip Distributive laws: *}
lemma Int_Union: "A \<inter> \<Union>B = (\<Union>C\<in>B. A \<inter> C)"
by blast
lemma Int_Union2: "\<Union>B \<inter> A = (\<Union>C\<in>B. C \<inter> A)"
by blast
lemma Un_Union_image: "(\<Union>x\<in>C. A x \<union> B x) = \<Union>(A`C) \<union> \<Union>(B`C)"
-- {* Devlin, Fundamentals of Contemporary Set Theory, page 12, exercise 5: *}
-- {* Union of a family of unions *}
by blast
lemma UN_Un_distrib: "(\<Union>i\<in>I. A i \<union> B i) = (\<Union>i\<in>I. A i) \<union> (\<Union>i\<in>I. B i)"
-- {* Equivalent version *}
by blast
lemma Un_Inter: "A \<union> \<Inter>B = (\<Inter>C\<in>B. A \<union> C)"
by blast
lemma Int_Inter_image: "(\<Inter>x\<in>C. A x \<inter> B x) = \<Inter>(A`C) \<inter> \<Inter>(B`C)"
by blast
lemma INT_Int_distrib: "(\<Inter>i\<in>I. A i \<inter> B i) = (\<Inter>i\<in>I. A i) \<inter> (\<Inter>i\<in>I. B i)"
-- {* Equivalent version *}
by blast
lemma Int_UN_distrib: "B \<inter> (\<Union>i\<in>I. A i) = (\<Union>i\<in>I. B \<inter> A i)"
-- {* Halmos, Naive Set Theory, page 35. *}
by blast
lemma Un_INT_distrib: "B \<union> (\<Inter>i\<in>I. A i) = (\<Inter>i\<in>I. B \<union> A i)"
by blast
lemma Int_UN_distrib2: "(\<Union>i\<in>I. A i) \<inter> (\<Union>j\<in>J. B j) = (\<Union>i\<in>I. \<Union>j\<in>J. A i \<inter> B j)"
by blast
lemma Un_INT_distrib2: "(\<Inter>i\<in>I. A i) \<union> (\<Inter>j\<in>J. B j) = (\<Inter>i\<in>I. \<Inter>j\<in>J. A i \<union> B j)"
by blast
text {* \medskip Bounded quantifiers.
The following are not added to the default simpset because
(a) they duplicate the body and (b) there are no similar rules for @{text Int}. *}
lemma ball_Un: "(\<forall>x \<in> A \<union> B. P x) = ((\<forall>x\<in>A. P x) & (\<forall>x\<in>B. P x))"
by blast
lemma bex_Un: "(\<exists>x \<in> A \<union> B. P x) = ((\<exists>x\<in>A. P x) | (\<exists>x\<in>B. P x))"
by blast
lemma ball_UN: "(\<forall>z \<in> UNION A B. P z) = (\<forall>x\<in>A. \<forall>z \<in> B x. P z)"
by blast
lemma bex_UN: "(\<exists>z \<in> UNION A B. P z) = (\<exists>x\<in>A. \<exists>z\<in>B x. P z)"
by blast
text {* \medskip Set difference. *}
lemma Diff_eq: "A - B = A \<inter> (-B)"
by blast
lemma Diff_eq_empty_iff [simp]: "(A - B = {}) = (A \<subseteq> B)"
by blast
lemma Diff_cancel [simp]: "A - A = {}"
by blast
lemma Diff_idemp [simp]: "(A - B) - B = A - (B::'a set)"
by blast
lemma Diff_triv: "A \<inter> B = {} ==> A - B = A"
by (blast elim: equalityE)
lemma empty_Diff [simp]: "{} - A = {}"
by blast
lemma Diff_empty [simp]: "A - {} = A"
by blast
lemma Diff_UNIV [simp]: "A - UNIV = {}"
by blast
lemma Diff_insert0 [simp]: "x \<notin> A ==> A - insert x B = A - B"
by blast
lemma Diff_insert: "A - insert a B = A - B - {a}"
-- {* NOT SUITABLE FOR REWRITING since @{text "{a} == insert a 0"} *}
by blast
lemma Diff_insert2: "A - insert a B = A - {a} - B"
-- {* NOT SUITABLE FOR REWRITING since @{text "{a} == insert a 0"} *}
by blast
lemma insert_Diff_if: "insert x A - B = (if x \<in> B then A - B else insert x (A - B))"
by auto
lemma insert_Diff1 [simp]: "x \<in> B ==> insert x A - B = A - B"
by blast
lemma insert_Diff_single[simp]: "insert a (A - {a}) = insert a A"
by blast
lemma insert_Diff: "a \<in> A ==> insert a (A - {a}) = A"
by blast
lemma Diff_insert_absorb: "x \<notin> A ==> (insert x A) - {x} = A"
by auto
lemma Diff_disjoint [simp]: "A \<inter> (B - A) = {}"
by blast
lemma Diff_partition: "A \<subseteq> B ==> A \<union> (B - A) = B"
by blast
lemma double_diff: "A \<subseteq> B ==> B \<subseteq> C ==> B - (C - A) = A"
by blast
lemma Un_Diff_cancel [simp]: "A \<union> (B - A) = A \<union> B"
by blast
lemma Un_Diff_cancel2 [simp]: "(B - A) \<union> A = B \<union> A"
by blast
lemma Diff_Un: "A - (B \<union> C) = (A - B) \<inter> (A - C)"
by blast
lemma Diff_Int: "A - (B \<inter> C) = (A - B) \<union> (A - C)"
by blast
lemma Un_Diff: "(A \<union> B) - C = (A - C) \<union> (B - C)"
by blast
lemma Int_Diff: "(A \<inter> B) - C = A \<inter> (B - C)"
by blast
lemma Diff_Int_distrib: "C \<inter> (A - B) = (C \<inter> A) - (C \<inter> B)"
by blast
lemma Diff_Int_distrib2: "(A - B) \<inter> C = (A \<inter> C) - (B \<inter> C)"
by blast
lemma Diff_Compl [simp]: "A - (- B) = A \<inter> B"
by auto
lemma Compl_Diff_eq [simp]: "- (A - B) = -A \<union> B"
by blast
text {* \medskip Quantification over type @{typ bool}. *}
lemma all_bool_eq: "(\<forall>b::bool. P b) = (P True & P False)"
apply auto
apply (tactic {* case_tac "b" 1 *}, auto)
done
lemma bool_induct: "P True \<Longrightarrow> P False \<Longrightarrow> P x"
by (rule conjI [THEN all_bool_eq [THEN iffD2], THEN spec])
lemma ex_bool_eq: "(\<exists>b::bool. P b) = (P True | P False)"
apply auto
apply (tactic {* case_tac "b" 1 *}, auto)
done
lemma Un_eq_UN: "A \<union> B = (\<Union>b. if b then A else B)"
by (auto simp add: split_if_mem2)
lemma UN_bool_eq: "(\<Union>b::bool. A b) = (A True \<union> A False)"
apply auto
apply (tactic {* case_tac "b" 1 *}, auto)
done
lemma INT_bool_eq: "(\<Inter>b::bool. A b) = (A True \<inter> A False)"
apply auto
apply (tactic {* case_tac "b" 1 *}, auto)
done
text {* \medskip @{text Pow} *}
lemma Pow_empty [simp]: "Pow {} = {{}}"
by (auto simp add: Pow_def)
lemma Pow_insert: "Pow (insert a A) = Pow A \<union> (insert a ` Pow A)"
by (blast intro: image_eqI [where ?x = "u - {a}", standard])
lemma Pow_Compl: "Pow (- A) = {-B | B. A \<in> Pow B}"
by (blast intro: exI [where ?x = "- u", standard])
lemma Pow_UNIV [simp]: "Pow UNIV = UNIV"
by blast
lemma Un_Pow_subset: "Pow A \<union> Pow B \<subseteq> Pow (A \<union> B)"
by blast
lemma UN_Pow_subset: "(\<Union>x\<in>A. Pow (B x)) \<subseteq> Pow (\<Union>x\<in>A. B x)"
by blast
lemma subset_Pow_Union: "A \<subseteq> Pow (\<Union>A)"
by blast
lemma Union_Pow_eq [simp]: "\<Union>(Pow A) = A"
by blast
lemma Pow_Int_eq [simp]: "Pow (A \<inter> B) = Pow A \<inter> Pow B"
by blast
lemma Pow_INT_eq: "Pow (\<Inter>x\<in>A. B x) = (\<Inter>x\<in>A. Pow (B x))"
by blast
text {* \medskip Miscellany. *}
lemma set_eq_subset: "(A = B) = (A \<subseteq> B & B \<subseteq> A)"
by blast
lemma subset_iff: "(A \<subseteq> B) = (\<forall>t. t \<in> A --> t \<in> B)"
by blast
lemma subset_iff_psubset_eq: "(A \<subseteq> B) = ((A \<subset> B) | (A = B))"
by (unfold psubset_def) blast
lemma all_not_in_conv [iff]: "(\<forall>x. x \<notin> A) = (A = {})"
by blast
lemma ex_in_conv: "(\<exists>x. x \<in> A) = (A \<noteq> {})"
by blast
lemma distinct_lemma: "f x \<noteq> f y ==> x \<noteq> y"
by rules
text {* \medskip Miniscoping: pushing in quantifiers and big Unions
and Intersections. *}
lemma UN_simps [simp]:
"!!a B C. (UN x:C. insert a (B x)) = (if C={} then {} else insert a (UN x:C. B x))"
"!!A B C. (UN x:C. A x Un B) = ((if C={} then {} else (UN x:C. A x) Un B))"
"!!A B C. (UN x:C. A Un B x) = ((if C={} then {} else A Un (UN x:C. B x)))"
"!!A B C. (UN x:C. A x Int B) = ((UN x:C. A x) Int B)"
"!!A B C. (UN x:C. A Int B x) = (A Int (UN x:C. B x))"
"!!A B C. (UN x:C. A x - B) = ((UN x:C. A x) - B)"
"!!A B C. (UN x:C. A - B x) = (A - (INT x:C. B x))"
"!!A B. (UN x: Union A. B x) = (UN y:A. UN x:y. B x)"
"!!A B C. (UN z: UNION A B. C z) = (UN x:A. UN z: B(x). C z)"
"!!A B f. (UN x:f`A. B x) = (UN a:A. B (f a))"
by auto
lemma INT_simps [simp]:
"!!A B C. (INT x:C. A x Int B) = (if C={} then UNIV else (INT x:C. A x) Int B)"
"!!A B C. (INT x:C. A Int B x) = (if C={} then UNIV else A Int (INT x:C. B x))"
"!!A B C. (INT x:C. A x - B) = (if C={} then UNIV else (INT x:C. A x) - B)"
"!!A B C. (INT x:C. A - B x) = (if C={} then UNIV else A - (UN x:C. B x))"
"!!a B C. (INT x:C. insert a (B x)) = insert a (INT x:C. B x)"
"!!A B C. (INT x:C. A x Un B) = ((INT x:C. A x) Un B)"
"!!A B C. (INT x:C. A Un B x) = (A Un (INT x:C. B x))"
"!!A B. (INT x: Union A. B x) = (INT y:A. INT x:y. B x)"
"!!A B C. (INT z: UNION A B. C z) = (INT x:A. INT z: B(x). C z)"
"!!A B f. (INT x:f`A. B x) = (INT a:A. B (f a))"
by auto
lemma ball_simps [simp]:
"!!A P Q. (ALL x:A. P x | Q) = ((ALL x:A. P x) | Q)"
"!!A P Q. (ALL x:A. P | Q x) = (P | (ALL x:A. Q x))"
"!!A P Q. (ALL x:A. P --> Q x) = (P --> (ALL x:A. Q x))"
"!!A P Q. (ALL x:A. P x --> Q) = ((EX x:A. P x) --> Q)"
"!!P. (ALL x:{}. P x) = True"
"!!P. (ALL x:UNIV. P x) = (ALL x. P x)"
"!!a B P. (ALL x:insert a B. P x) = (P a & (ALL x:B. P x))"
"!!A P. (ALL x:Union A. P x) = (ALL y:A. ALL x:y. P x)"
"!!A B P. (ALL x: UNION A B. P x) = (ALL a:A. ALL x: B a. P x)"
"!!P Q. (ALL x:Collect Q. P x) = (ALL x. Q x --> P x)"
"!!A P f. (ALL x:f`A. P x) = (ALL x:A. P (f x))"
"!!A P. (~(ALL x:A. P x)) = (EX x:A. ~P x)"
by auto
lemma bex_simps [simp]:
"!!A P Q. (EX x:A. P x & Q) = ((EX x:A. P x) & Q)"
"!!A P Q. (EX x:A. P & Q x) = (P & (EX x:A. Q x))"
"!!P. (EX x:{}. P x) = False"
"!!P. (EX x:UNIV. P x) = (EX x. P x)"
"!!a B P. (EX x:insert a B. P x) = (P(a) | (EX x:B. P x))"
"!!A P. (EX x:Union A. P x) = (EX y:A. EX x:y. P x)"
"!!A B P. (EX x: UNION A B. P x) = (EX a:A. EX x:B a. P x)"
"!!P Q. (EX x:Collect Q. P x) = (EX x. Q x & P x)"
"!!A P f. (EX x:f`A. P x) = (EX x:A. P (f x))"
"!!A P. (~(EX x:A. P x)) = (ALL x:A. ~P x)"
by auto
lemma ball_conj_distrib:
"(ALL x:A. P x & Q x) = ((ALL x:A. P x) & (ALL x:A. Q x))"
by blast
lemma bex_disj_distrib:
"(EX x:A. P x | Q x) = ((EX x:A. P x) | (EX x:A. Q x))"
by blast
text {* \medskip Maxiscoping: pulling out big Unions and Intersections. *}
lemma UN_extend_simps:
"!!a B C. insert a (UN x:C. B x) = (if C={} then {a} else (UN x:C. insert a (B x)))"
"!!A B C. (UN x:C. A x) Un B = (if C={} then B else (UN x:C. A x Un B))"
"!!A B C. A Un (UN x:C. B x) = (if C={} then A else (UN x:C. A Un B x))"
"!!A B C. ((UN x:C. A x) Int B) = (UN x:C. A x Int B)"
"!!A B C. (A Int (UN x:C. B x)) = (UN x:C. A Int B x)"
"!!A B C. ((UN x:C. A x) - B) = (UN x:C. A x - B)"
"!!A B C. (A - (INT x:C. B x)) = (UN x:C. A - B x)"
"!!A B. (UN y:A. UN x:y. B x) = (UN x: Union A. B x)"
"!!A B C. (UN x:A. UN z: B(x). C z) = (UN z: UNION A B. C z)"
"!!A B f. (UN a:A. B (f a)) = (UN x:f`A. B x)"
by auto
lemma INT_extend_simps:
"!!A B C. (INT x:C. A x) Int B = (if C={} then B else (INT x:C. A x Int B))"
"!!A B C. A Int (INT x:C. B x) = (if C={} then A else (INT x:C. A Int B x))"
"!!A B C. (INT x:C. A x) - B = (if C={} then UNIV-B else (INT x:C. A x - B))"
"!!A B C. A - (UN x:C. B x) = (if C={} then A else (INT x:C. A - B x))"
"!!a B C. insert a (INT x:C. B x) = (INT x:C. insert a (B x))"
"!!A B C. ((INT x:C. A x) Un B) = (INT x:C. A x Un B)"
"!!A B C. A Un (INT x:C. B x) = (INT x:C. A Un B x)"
"!!A B. (INT y:A. INT x:y. B x) = (INT x: Union A. B x)"
"!!A B C. (INT x:A. INT z: B(x). C z) = (INT z: UNION A B. C z)"
"!!A B f. (INT a:A. B (f a)) = (INT x:f`A. B x)"
by auto
subsubsection {* Monotonicity of various operations *}
lemma image_mono: "A \<subseteq> B ==> f`A \<subseteq> f`B"
by blast
lemma Pow_mono: "A \<subseteq> B ==> Pow A \<subseteq> Pow B"
by blast
lemma Union_mono: "A \<subseteq> B ==> \<Union>A \<subseteq> \<Union>B"
by blast
lemma Inter_anti_mono: "B \<subseteq> A ==> \<Inter>A \<subseteq> \<Inter>B"
by blast
lemma UN_mono:
"A \<subseteq> B ==> (!!x. x \<in> A ==> f x \<subseteq> g x) ==>
(\<Union>x\<in>A. f x) \<subseteq> (\<Union>x\<in>B. g x)"
by (blast dest: subsetD)
lemma INT_anti_mono:
"B \<subseteq> A ==> (!!x. x \<in> A ==> f x \<subseteq> g x) ==>
(\<Inter>x\<in>A. f x) \<subseteq> (\<Inter>x\<in>A. g x)"
-- {* The last inclusion is POSITIVE! *}
by (blast dest: subsetD)
lemma insert_mono: "C \<subseteq> D ==> insert a C \<subseteq> insert a D"
by blast
lemma Un_mono: "A \<subseteq> C ==> B \<subseteq> D ==> A \<union> B \<subseteq> C \<union> D"
by blast
lemma Int_mono: "A \<subseteq> C ==> B \<subseteq> D ==> A \<inter> B \<subseteq> C \<inter> D"
by blast
lemma Diff_mono: "A \<subseteq> C ==> D \<subseteq> B ==> A - B \<subseteq> C - D"
by blast
lemma Compl_anti_mono: "A \<subseteq> B ==> -B \<subseteq> -A"
by blast
text {* \medskip Monotonicity of implications. *}
lemma in_mono: "A \<subseteq> B ==> x \<in> A --> x \<in> B"
apply (rule impI)
apply (erule subsetD, assumption)
done
lemma conj_mono: "P1 --> Q1 ==> P2 --> Q2 ==> (P1 & P2) --> (Q1 & Q2)"
by rules
lemma disj_mono: "P1 --> Q1 ==> P2 --> Q2 ==> (P1 | P2) --> (Q1 | Q2)"
by rules
lemma imp_mono: "Q1 --> P1 ==> P2 --> Q2 ==> (P1 --> P2) --> (Q1 --> Q2)"
by rules
lemma imp_refl: "P --> P" ..
lemma ex_mono: "(!!x. P x --> Q x) ==> (EX x. P x) --> (EX x. Q x)"
by rules
lemma all_mono: "(!!x. P x --> Q x) ==> (ALL x. P x) --> (ALL x. Q x)"
by rules
lemma Collect_mono: "(!!x. P x --> Q x) ==> Collect P \<subseteq> Collect Q"
by blast
lemma Int_Collect_mono:
"A \<subseteq> B ==> (!!x. x \<in> A ==> P x --> Q x) ==> A \<inter> Collect P \<subseteq> B \<inter> Collect Q"
by blast
lemmas basic_monos =
subset_refl imp_refl disj_mono conj_mono
ex_mono Collect_mono in_mono
lemma eq_to_mono: "a = b ==> c = d ==> b --> d ==> a --> c"
by rules
lemma eq_to_mono2: "a = b ==> c = d ==> ~ b --> ~ d ==> ~ a --> ~ c"
by rules
lemma Least_mono:
"mono (f::'a::order => 'b::order) ==> EX x:S. ALL y:S. x <= y
==> (LEAST y. y : f ` S) = f (LEAST x. x : S)"
-- {* Courtesy of Stephan Merz *}
apply clarify
apply (erule_tac P = "%x. x : S" in LeastI2, fast)
apply (rule LeastI2)
apply (auto elim: monoD intro!: order_antisym)
done
subsection {* Inverse image of a function *}
constdefs
vimage :: "('a => 'b) => 'b set => 'a set" (infixr "-`" 90)
"f -` B == {x. f x : B}"
subsubsection {* Basic rules *}
lemma vimage_eq [simp]: "(a : f -` B) = (f a : B)"
by (unfold vimage_def) blast
lemma vimage_singleton_eq: "(a : f -` {b}) = (f a = b)"
by simp
lemma vimageI [intro]: "f a = b ==> b:B ==> a : f -` B"
by (unfold vimage_def) blast
lemma vimageI2: "f a : A ==> a : f -` A"
by (unfold vimage_def) fast
lemma vimageE [elim!]: "a: f -` B ==> (!!x. f a = x ==> x:B ==> P) ==> P"
by (unfold vimage_def) blast
lemma vimageD: "a : f -` A ==> f a : A"
by (unfold vimage_def) fast
subsubsection {* Equations *}
lemma vimage_empty [simp]: "f -` {} = {}"
by blast
lemma vimage_Compl: "f -` (-A) = -(f -` A)"
by blast
lemma vimage_Un [simp]: "f -` (A Un B) = (f -` A) Un (f -` B)"
by blast
lemma vimage_Int [simp]: "f -` (A Int B) = (f -` A) Int (f -` B)"
by fast
lemma vimage_Union: "f -` (Union A) = (UN X:A. f -` X)"
by blast
lemma vimage_UN: "f-`(UN x:A. B x) = (UN x:A. f -` B x)"
by blast
lemma vimage_INT: "f-`(INT x:A. B x) = (INT x:A. f -` B x)"
by blast
lemma vimage_Collect_eq [simp]: "f -` Collect P = {y. P (f y)}"
by blast
lemma vimage_Collect: "(!!x. P (f x) = Q x) ==> f -` (Collect P) = Collect Q"
by blast
lemma vimage_insert: "f-`(insert a B) = (f-`{a}) Un (f-`B)"
-- {* NOT suitable for rewriting because of the recurrence of @{term "{a}"}. *}
by blast
lemma vimage_Diff: "f -` (A - B) = (f -` A) - (f -` B)"
by blast
lemma vimage_UNIV [simp]: "f -` UNIV = UNIV"
by blast
lemma vimage_eq_UN: "f-`B = (UN y: B. f-`{y})"
-- {* NOT suitable for rewriting *}
by blast
lemma vimage_mono: "A \<subseteq> B ==> f -` A \<subseteq> f -` B"
-- {* monotonicity *}
by blast
subsection {* Transitivity rules for calculational reasoning *}
lemma forw_subst: "a = b ==> P b ==> P a"
by (rule ssubst)
lemma back_subst: "P a ==> a = b ==> P b"
by (rule subst)
lemma set_rev_mp: "x:A ==> A \<subseteq> B ==> x:B"
by (rule subsetD)
lemma set_mp: "A \<subseteq> B ==> x:A ==> x:B"
by (rule subsetD)
lemma order_neq_le_trans: "a ~= b ==> (a::'a::order) <= b ==> a < b"
by (simp add: order_less_le)
lemma order_le_neq_trans: "(a::'a::order) <= b ==> a ~= b ==> a < b"
by (simp add: order_less_le)
lemma order_less_asym': "(a::'a::order) < b ==> b < a ==> P"
by (rule order_less_asym)
lemma ord_le_eq_trans: "a <= b ==> b = c ==> a <= c"
by (rule subst)
lemma ord_eq_le_trans: "a = b ==> b <= c ==> a <= c"
by (rule ssubst)
lemma ord_less_eq_trans: "a < b ==> b = c ==> a < c"
by (rule subst)
lemma ord_eq_less_trans: "a = b ==> b < c ==> a < c"
by (rule ssubst)
lemma order_less_subst2: "(a::'a::order) < b ==> f b < (c::'c::order) ==>
(!!x y. x < y ==> f x < f y) ==> f a < c"
proof -
assume r: "!!x y. x < y ==> f x < f y"
assume "a < b" hence "f a < f b" by (rule r)
also assume "f b < c"
finally (order_less_trans) show ?thesis .
qed
lemma order_less_subst1: "(a::'a::order) < f b ==> (b::'b::order) < c ==>
(!!x y. x < y ==> f x < f y) ==> a < f c"
proof -
assume r: "!!x y. x < y ==> f x < f y"
assume "a < f b"
also assume "b < c" hence "f b < f c" by (rule r)
finally (order_less_trans) show ?thesis .
qed
lemma order_le_less_subst2: "(a::'a::order) <= b ==> f b < (c::'c::order) ==>
(!!x y. x <= y ==> f x <= f y) ==> f a < c"
proof -
assume r: "!!x y. x <= y ==> f x <= f y"
assume "a <= b" hence "f a <= f b" by (rule r)
also assume "f b < c"
finally (order_le_less_trans) show ?thesis .
qed
lemma order_le_less_subst1: "(a::'a::order) <= f b ==> (b::'b::order) < c ==>
(!!x y. x < y ==> f x < f y) ==> a < f c"
proof -
assume r: "!!x y. x < y ==> f x < f y"
assume "a <= f b"
also assume "b < c" hence "f b < f c" by (rule r)
finally (order_le_less_trans) show ?thesis .
qed
lemma order_less_le_subst2: "(a::'a::order) < b ==> f b <= (c::'c::order) ==>
(!!x y. x < y ==> f x < f y) ==> f a < c"
proof -
assume r: "!!x y. x < y ==> f x < f y"
assume "a < b" hence "f a < f b" by (rule r)
also assume "f b <= c"
finally (order_less_le_trans) show ?thesis .
qed
lemma order_less_le_subst1: "(a::'a::order) < f b ==> (b::'b::order) <= c ==>
(!!x y. x <= y ==> f x <= f y) ==> a < f c"
proof -
assume r: "!!x y. x <= y ==> f x <= f y"
assume "a < f b"
also assume "b <= c" hence "f b <= f c" by (rule r)
finally (order_less_le_trans) show ?thesis .
qed
lemma order_subst1: "(a::'a::order) <= f b ==> (b::'b::order) <= c ==>
(!!x y. x <= y ==> f x <= f y) ==> a <= f c"
proof -
assume r: "!!x y. x <= y ==> f x <= f y"
assume "a <= f b"
also assume "b <= c" hence "f b <= f c" by (rule r)
finally (order_trans) show ?thesis .
qed
lemma order_subst2: "(a::'a::order) <= b ==> f b <= (c::'c::order) ==>
(!!x y. x <= y ==> f x <= f y) ==> f a <= c"
proof -
assume r: "!!x y. x <= y ==> f x <= f y"
assume "a <= b" hence "f a <= f b" by (rule r)
also assume "f b <= c"
finally (order_trans) show ?thesis .
qed
lemma ord_le_eq_subst: "a <= b ==> f b = c ==>
(!!x y. x <= y ==> f x <= f y) ==> f a <= c"
proof -
assume r: "!!x y. x <= y ==> f x <= f y"
assume "a <= b" hence "f a <= f b" by (rule r)
also assume "f b = c"
finally (ord_le_eq_trans) show ?thesis .
qed
lemma ord_eq_le_subst: "a = f b ==> b <= c ==>
(!!x y. x <= y ==> f x <= f y) ==> a <= f c"
proof -
assume r: "!!x y. x <= y ==> f x <= f y"
assume "a = f b"
also assume "b <= c" hence "f b <= f c" by (rule r)
finally (ord_eq_le_trans) show ?thesis .
qed
lemma ord_less_eq_subst: "a < b ==> f b = c ==>
(!!x y. x < y ==> f x < f y) ==> f a < c"
proof -
assume r: "!!x y. x < y ==> f x < f y"
assume "a < b" hence "f a < f b" by (rule r)
also assume "f b = c"
finally (ord_less_eq_trans) show ?thesis .
qed
lemma ord_eq_less_subst: "a = f b ==> b < c ==>
(!!x y. x < y ==> f x < f y) ==> a < f c"
proof -
assume r: "!!x y. x < y ==> f x < f y"
assume "a = f b"
also assume "b < c" hence "f b < f c" by (rule r)
finally (ord_eq_less_trans) show ?thesis .
qed
text {*
Note that this list of rules is in reverse order of priorities.
*}
lemmas basic_trans_rules [trans] =
order_less_subst2
order_less_subst1
order_le_less_subst2
order_le_less_subst1
order_less_le_subst2
order_less_le_subst1
order_subst2
order_subst1
ord_le_eq_subst
ord_eq_le_subst
ord_less_eq_subst
ord_eq_less_subst
forw_subst
back_subst
rev_mp
mp
set_rev_mp
set_mp
order_neq_le_trans
order_le_neq_trans
order_less_trans
order_less_asym'
order_le_less_trans
order_less_le_trans
order_trans
order_antisym
ord_le_eq_trans
ord_eq_le_trans
ord_less_eq_trans
ord_eq_less_trans
trans
end