Module mathcomp.classical.cardinality
From HB Require Import structures.From mathcomp Require Import all_ssreflect finmap ssralg ssrnum ssrint rat.
From mathcomp Require Import mathcomp_extra boolp classical_sets functions.
# Cardinality
This file provides an account of cardinality properties of classical sets.
This includes standard results of set theory such as the Pigeon Hole
principle, the Cantor-Bernstein Theorem, or lemmas about the cardinal of
nat, nat * nat, and rat.
Since universe polymorphism is not yet available in our framework, we
develop a relational theory of cardinals: there is no type for cardinals
only relations A #<= B and A #= B to compare the cardinals of two sets
(on two possibly different types).
```
A #<= B == the cardinal of A is smaller or equal to the one of B
A #>= B := B #<= A
A #= B == the cardinal of A is equal to the cardinal of B
A #!= B := ~~ (A #= B)
finite_set A == the set A is finite
:= exists n, A #= `I_n
<-> exists X : {fset T}, A = [set` X]
<-> ~ ([set: nat] #<= A)
infinite_set A := ~ finite_set A
countable A <-> A is countable
:= A #<= [set: nat]
fset_set A == the finite set corresponding if A : set T is finite,
set0 otherwise (T : choiceType)
A.`1 := [fset x.1 | x in A]
A.`2 := [fset x.2 | x in A]
{fimfun aT >-> T} == type of functions with a finite image
```
Set Implicit Arguments.
Unset Strict Implicit.
Unset Printing Implicit Defensive.
Reserved Notation "A '#<=' B" (at level 79, format "A '#<=' B").
Reserved Notation "A '#>=' B" (at level 79, format "A '#>=' B").
Reserved Notation "A '#=' B" (at level 79, format "A '#=' B").
Reserved Notation "A '#!=' B" (at level 79, format "A '#!=' B").
Import Order.Theory GRing.Theory.
Local Open Scope classical_set_scope.
Local Open Scope ring_scope.
Local Open Scope function_scope.
Declare Scope card_scope.
Delimit Scope card_scope with card.
Local Open Scope card_scope.
Definition card_le T U (A : set T) (B : set U) :=
`[< $|{injfun [set: A] >-> [set: B]}| >].
Notation "A '#<=' B" := (card_le A B) : card_scope.
Notation "A '#>=' B" := (card_le B A) (only parsing) : card_scope.
Definition card_eq T U (A : set T) (B : set U) :=
`[< $|{bij [set: A] >-> [set: B]}| >].
Notation "A '#=' B" := (card_eq A B) : card_scope.
Notation "A '#!=' B" := (~~ (card_eq A B)) : card_scope.
Definition finite_set {T} (A : set T) := exists n, A #= `I_n.
Notation infinite_set A := (~ finite_set A).
Lemma injPex {T U} {A : set T} :
$|{inj A >-> U}| <-> exists f : T -> U, set_inj A f.
Proof.
Lemma surjPex {T U} {A : set T} {B : set U} :
$|{surj A >-> B}| <-> exists f, set_surj A B f.
Proof.
Lemma bijPex {T U} {A : set T} {B : set U} :
$|{bij A >-> B}| <-> exists f, set_bij A B f.
Proof.
Lemma surjfunPex {T U} {A : set T} {B : set U} :
$|{surjfun A >-> B}| <-> exists f, B = f @` A.
Proof.
Lemma injfunPex {T U} {A : set T} {B : set U}:
$|{injfun A >-> B}| <-> exists2 f : T -> U, set_fun A B f & set_inj A f.
Lemma card_leP {T U} {A : set T} {B : set U} :
reflect $|{injfun [set: A] >-> [set: B]}| (A #<= B).
Proof.
Lemma inj_card_le {T U} {A : set T} {B : set U} : {injfun A >-> B} -> (A #<= B).
Lemma pcard_leP {T} {U : pointedType} {A : set T} {B : set U} :
reflect $|{injfun A >-> B}| (A #<= B).
Lemma pcard_leTP {T} {U : pointedType} {A : set T} :
reflect $|{inj A >-> U}| (A #<= [set: U]).
Proof.
Lemma pcard_injP {T} {U : pointedType} {A : set T} :
reflect (exists f : T -> U, {in A &, injective f}) (A #<= [set: U]).
Proof.
Lemma ppcard_leP {T U : pointedType} {A : set T} {B : set U} :
reflect $|{splitinjfun A >-> B}| (A #<= B).
Lemma card_ge0 T U (S : set U) : @set0 T #<= S.
#[global] Hint Resolve card_ge0 : core.
Lemma card_le0P T U (A : set T) : reflect (A = set0) (A #<= @set0 U).
Proof.
Lemma card_le0 T U (A : set T) : (A #<= @set0 U) = (A == set0).
Lemma card_eqP {T U} {A : set T} {B : set U} :
reflect $|{bij [set: A] >-> [set: B]}| (A #= B).
Proof.
Lemma pcard_eq {T U} {A : set T} {B : set U} : {bij A >-> B} -> A #= B.
Lemma pcard_eqP {T} {U : pointedType} {A : set T} {B : set U} :
reflect $| {bij A >-> B} | (A #= B).
Lemma card_bijP {T U} {A : set T} {B : set U} :
reflect (exists f : A -> B, bijective f) (A #= B).
Lemma card_eqVP {T U} {A : set T} {B : set U} :
reflect $|{splitbij [set: A] >-> [set: B]}| (A #= B).
Lemma card_set_bijP {T} {U : pointedType} {A : set T} {B : set U} :
reflect (exists f, set_bij A B f) (A #= B).
Lemma ppcard_eqP {T U : pointedType} {A : set T} {B : set U} :
reflect $| {splitbij A >-> B} | (A #= B).
Lemma card_eqxx T (A : set T) : A #= A.
#[global] Hint Resolve card_eqxx : core.
Lemma card_eq00 T U : @set0 T #= @set0 U.
Proof.
Section empty1.
Implicit Types (T : emptyType).
Lemma empty_eq0 T : all_equal_to (set0 : set T).
Lemma card_le_emptyl T U (A : set T) (B : set U) : A #<= B.
Proof.
Definition emptyE_subdef := (empty_eq0, card_le_emptyl, card_le_emptyr, eq_opE).
End empty1.
Theorem Cantor_Bernstein T U (A : set T) (B : set U) :
A #<= B -> B #<= A -> A #= B.
Proof.
elim/Ppointed: T => T in A *; first by rewrite !emptyE_subdef => _ ->.
elim/Ppointed: U => U in B *; first by rewrite !emptyE_subdef => ->.
suff {A B} card_eq (A B : set U) : B `<=` A -> A #<= B -> A #= B.
move=> /ppcard_leP[f] /ppcard_leP[g].
have /(_ _)/ppcard_eqP[|h] := card_eq _ _ (fun_image_sub f).
by apply/pcard_leP; squash ([fun f in A] \o g).
by apply/pcard_eqP; squash ((split h)^-1 \o [fun f in A]).
move=> BA /ppcard_leP[u]; have uAB := 'funS_u.
pose C_ := fix C n := if n is n.+1 then u @` C n else A `\` B.
pose C := \bigcup_n C_ n; have CA : C `<=` A.
by move=> + [] => /[swap]; elim=> [|i IH] y _ []// x /IH/uAB/BA + <-; apply.
have uC: {homo u : x / x \in C}.
by move=> x; rewrite !inE => -[i _ Cix]; exists i.+1 => //; exists x.
apply/card_set_bijP; exists (fun x => if x \in C then u x else x); split.
- move=> x Ax; case: ifPn; first by move=> _; apply: uAB.
by move/negP; apply: contra_notP => NBx; rewrite inE; exists 0%N.
- move=> x y xA yA; have := 'inj_u xA yA.
have [xC|] := boolP (x \in C); have [yC|] := boolP (y \in C) => // + _.
by move=> /[swap]<-; rewrite uC// xC.
by move=> /[swap]->; rewrite uC// yC.
- move=> y /[dup] By /BA Ay/=.
case: (boolP (y \in C)); last by exists y; rewrite // ifN.
rewrite inE => -[[|i]/= _ []// x Cix <-]; have Cx : C x by exists i.
by exists x; [exact: CA|rewrite ifT// inE].
Qed.
elim/Ppointed: U => U in B *; first by rewrite !emptyE_subdef => ->.
suff {A B} card_eq (A B : set U) : B `<=` A -> A #<= B -> A #= B.
move=> /ppcard_leP[f] /ppcard_leP[g].
have /(_ _)/ppcard_eqP[|h] := card_eq _ _ (fun_image_sub f).
by apply/pcard_leP; squash ([fun f in A] \o g).
by apply/pcard_eqP; squash ((split h)^-1 \o [fun f in A]).
move=> BA /ppcard_leP[u]; have uAB := 'funS_u.
pose C_ := fix C n := if n is n.+1 then u @` C n else A `\` B.
pose C := \bigcup_n C_ n; have CA : C `<=` A.
by move=> + [] => /[swap]; elim=> [|i IH] y _ []// x /IH/uAB/BA + <-; apply.
have uC: {homo u : x / x \in C}.
by move=> x; rewrite !inE => -[i _ Cix]; exists i.+1 => //; exists x.
apply/card_set_bijP; exists (fun x => if x \in C then u x else x); split.
- move=> x Ax; case: ifPn; first by move=> _; apply: uAB.
by move/negP; apply: contra_notP => NBx; rewrite inE; exists 0%N.
- move=> x y xA yA; have := 'inj_u xA yA.
have [xC|] := boolP (x \in C); have [yC|] := boolP (y \in C) => // + _.
by move=> /[swap]<-; rewrite uC// xC.
by move=> /[swap]->; rewrite uC// yC.
- move=> y /[dup] By /BA Ay/=.
case: (boolP (y \in C)); last by exists y; rewrite // ifN.
rewrite inE => -[[|i]/= _ []// x Cix <-]; have Cx : C x by exists i.
by exists x; [exact: CA|rewrite ifT// inE].
Qed.
Lemma card_esym T U (A : set T) (B : set U) : A #= B -> B #= A.
Lemma card_eq_le T U (A : set T) (B : set U) :
(A #= B) = (A #<= B) && (B #<= A).
Proof.
Lemma card_eqPle T U (A : set T) (B : set U) :
(A #= B) <-> (A #<= B) /\ (B #<= A).
Proof.
Lemma card_lexx T (A : set T) : A #<= A.
#[global] Hint Resolve card_lexx : core.
Lemma card_leT T (S : set T) : S #<= [set: T].
Lemma subset_card_le T (A B : set T) : A `<=` B -> A #<= B.
Lemma card_image_le {T U} (f : T -> U) (A : set T) : f @` A #<= A.
Proof.
elim/Ppointed: T => T in A f *; first by rewrite !emptyE_subdef image_set0.
by apply/pcard_leP; squash (pinv A f).
Qed.
by apply/pcard_leP; squash (pinv A f).
Qed.
Lemma inj_card_eq {T U} {A} {f : T -> U} : {in A &, injective f} -> f @` A #= A.
Arguments inj_card_eq {T U A f}.
Lemma card_some {T} {A : set T} : some @` A #= A.
Proof.
Lemma card_image {T U} {A : set T} (f : {inj A >-> U}) : f @` A #= A.
Proof.
Lemma card_imsub {T U} (A : set T) (f : {inj A >-> U}) X : X `<=` A -> f @` X #= X.
Lemma card_le_trans (T U V : Type) (B : set U) (A : set T) (C : set V) :
A #<= B -> B #<= C -> A #<= C.
Lemma card_eq_sym T U (A : set T) (B : set U) : (A #= B) = (B #= A).
Proof.
Lemma card_eq_trans T U V (A : set T) (B : set U) (C : set V) :
A #= B -> B #= C -> A #= C.
Lemma card_le_eql T T' T'' (A : set T) (B : set T') [C : set T''] :
A #= B -> (A #<= C) = (B #<= C).
Proof.
Lemma card_le_eqr T T' T'' (A : set T) (B : set T') [C : set T''] :
A #= B -> (C #<= A) = (C #<= B).
Proof.
Lemma card_eql T T' T'' (A : set T) (B : set T') [C : set T''] :
A #= B -> (A #= C) = (B #= C).
Proof.
Lemma card_eqr T T' T'' (A : set T) (B : set T') [C : set T''] :
A #= B -> (C #= A) = (C #= B).
Proof.
Lemma card_ge_image {T U V} {A : set T} (f : {inj A >-> U}) X (Y : set V) :
X `<=` A -> (f @` X #<= Y) = (X #<= Y).
Proof.
Lemma card_le_image {T U V} {A : set T} (f : {inj A >-> U}) X (Y : set V) :
X `<=` A -> (Y #<= f @` X) = (Y #<= X).
Proof.
Lemma card_le_image2 {T U} (A : set T) (f : {inj A >-> U}) X Y :
X `<=` A -> Y `<=` A ->
(f @` X #<= f @` Y) = (X #<= Y).
Proof.
Lemma card_eq_image {T U V} {A : set T} (f : {inj A >-> U}) X (Y : set V) :
X `<=` A -> (f @` X #= Y) = (X #= Y).
Proof.
Lemma card_eq_imager {T U V} {A : set T} (f : {inj A >-> U}) X (Y : set V) :
X `<=` A -> (Y #= f @` X) = (Y #= X).
Proof.
Lemma card_eq_image2 {T U} (A : set T) (f : {inj A >-> U}) X Y :
X `<=` A -> Y `<=` A ->
(f @` X #= f @` Y) = (X #= Y).
Proof.
Lemma card_ge_some {T T'} {A : set T} {B : set T'} :
(some @` A #<= B) = (A #<= B).
Proof.
Lemma card_le_some {T T'} {A : set T} {B : set T'} :
(A #<= some @` B) = (A #<= B).
Proof.
Lemma card_le_some2 {T T'} {A : set T} {B : set T'} :
(some @` A #<= some @` B) = (A #<= B).
Proof.
Lemma card_eq_somel {T T'} {A : set T} {B : set T'} :
(some @` A #= B) = (A #= B).
Lemma card_eq_somer {T T'} {A : set T} {B : set T'} :
(A #= some @` B) = (A #= B).
Lemma card_eq_some2 {T T'} {A : set T} {B : set T'} :
(some @` A #= some @` B) = (A #= B).
Proof.
Lemma card_eq0 {T U} {A : set T} : (A #= @set0 U) = (A == set0).
Proof.
Lemma card_set1 {T} {x : T} : [set x] #= `I_1.
Proof.
Lemma eq_card1 {T U} (x : T) (y : U) : [set x] #= [set y].
Lemma card_eq_emptyr (T : emptyType) U (A : set T) (B : set U) :
(B #= A) = (B == set0).
Lemma card_eq_emptyl (T : emptyType) U (A : set T) (B : set U) :
(A #= B) = (B == set0).
Proof.
Definition emptyE := (emptyE_subdef, card_eq_emptyr, card_eq_emptyl).
Lemma card_setT T (A : set T) : [set: A] #= A.
#[global] Hint Resolve card_setT : core.
Lemma card_setT_sym T (A : set T) : A #= [set: A].
#[global] Hint Resolve card_setT : core.
Lemma surj_card_ge {T U} {A : set T} {B : set U} : {surj B >-> A} -> A #<= B.
Proof.
Lemma pcard_surjP {T : pointedType} {U} {A : set T} {B : set U} :
reflect (exists g, set_surj B A g) (A #<= B).
Proof.
Lemma pcard_geP {T : pointedType} {U} {A : set T} {B : set U} :
reflect $|{surj B >-> A}| (A #<= B).
Proof.
Lemma ocard_geP {T U} {A : set T} {B : set U} :
reflect $|{surj B >-> some @` A}| (A #<= B).
Proof.
Lemma pfcard_geP {T U} {A : set T} {B : set U} :
reflect (A = set0 \/ $|{surjfun B >-> A}|) (A #<= B).
Proof.
apply: (iffP idP); last by move=> [->//|[f]]; apply: surj_card_ge; exact: f.
elim/Ppointed: T => T in A *; first by rewrite !emptyE; left.
elim/Ppointed: U => U in B *; first by rewrite !emptyE => ->; right; squash any.
move=> /pcard_geP[f]; case: (eqVneq A set0); first by left.
move=> /set0P[x Ax]; right; apply/surjfunPex.
exists (fun y => if f y \in A then f y else x).
apply/seteqP; split.
by move=> x' /[dup] /= /'surj_f [y By <-] Afy; exists y; rewrite ?ifT// inE.
by apply/image_subP => y By; case: ifPn; rewrite (inE, notin_setE).
Qed.
elim/Ppointed: T => T in A *; first by rewrite !emptyE; left.
elim/Ppointed: U => U in B *; first by rewrite !emptyE => ->; right; squash any.
move=> /pcard_geP[f]; case: (eqVneq A set0); first by left.
move=> /set0P[x Ax]; right; apply/surjfunPex.
exists (fun y => if f y \in A then f y else x).
apply/seteqP; split.
by move=> x' /[dup] /= /'surj_f [y By <-] Afy; exists y; rewrite ?ifT// inE.
by apply/image_subP => y By; case: ifPn; rewrite (inE, notin_setE).
Qed.
Lemma card_le_II n m : (`I_n #<= `I_m) = (n <= m)%N.
Proof.
Lemma ocard_eqP {T U} {A : set T} {B : set U} :
reflect $|{bij A >-> some @` B}| (A #= B).
Lemma oocard_eqP {T U} {A : set T} {B : set U} :
reflect $|{splitbij some @` A >-> some @` B}| (A #= B).
Proof.
Lemma card_eq_II {n m} : reflect (n = m) (`I_n #= `I_m).
Proof.
Lemma sub_setP {T} {A : set T} (X : set A) : set_val @` X `<=` A.
Proof.
Arguments image_subset {aT rT} f [A B].
Lemma card_subP T U (A : set T) (B : set U) :
reflect (exists2 C, C #= A & C `<=` B) (A #<= B).
Proof.
Lemma pigeonhole m n (f : nat -> nat) : {in `I_m &, injective f} ->
f @` `I_m `<=` `I_n -> (m <= n)%N.
Proof.
Definition countable T (A : set T) := A #<= @setT nat.
Lemma eq_countable T U (A : set T) (B : set U) :
A #= B -> countable A = countable B.
Proof.
Lemma countableP (T : countType) (A : set T) : countable A.
Proof.
Lemma countable0 T : countable (@set0 T)
Proof.
Lemma countable_injP T (A : set T) :
reflect (exists f : T -> nat, {in A &, injective f}) (countable A).
Proof.
Lemma countable_bijP T (A : set T) :
reflect (exists B : set nat, (A #= B)%card) (countable A).
Proof.
Lemma sub_countable T U (A : set T) (B : set U) : A #<= B ->
countable B -> countable A.
Proof.
Lemma finite_setP T (A : set T) : finite_set A <-> exists n, A #= `I_n.
Proof.
by []. Qed.
Lemma finite_II n : finite_set `I_n. Proof. by apply/finite_setP; exists n.#[global] Hint Resolve finite_II : core.
Lemma card_II {n} : `I_n #= [set: 'I_n].
Lemma finite_fsetP {T : choiceType} {A : set T} :
finite_set A <-> exists X : {fset T}, A = [set` X].
Proof.
rewrite finite_setP; split=> [[n]|[X {A}->]]; last first.
exists #|{: X}|; rewrite (card_eqr card_II).
by apply/card_eqP; squash (to_setT \o enum_rank \o val_finset).
rewrite (card_eqr card_II) => /card_esym/card_eqVP[f]; pose g := f \o to_setT.
exists [fset val (g i) | i in 'I_n]%fset.
apply/seteqP; split=> [x /mem_set Ax|_ /imfsetP[i _ ->]]; last exact: set_valP.
by apply/imfsetP; exists (g^-1 (SigSub Ax)); rewrite ?[g _]invK//= inE.
Qed.
exists #|{: X}|; rewrite (card_eqr card_II).
by apply/card_eqP; squash (to_setT \o enum_rank \o val_finset).
rewrite (card_eqr card_II) => /card_esym/card_eqVP[f]; pose g := f \o to_setT.
exists [fset val (g i) | i in 'I_n]%fset.
apply/seteqP; split=> [x /mem_set Ax|_ /imfsetP[i _ ->]]; last exact: set_valP.
by apply/imfsetP; exists (g^-1 (SigSub Ax)); rewrite ?[g _]invK//= inE.
Qed.
Lemma finite_subfset {T : choiceType} (X : {fset T}) {A : set T} :
A `<=` [set` X] -> finite_set A.
Proof.
Lemma finite_set0 T : finite_set (set0 : set T).
Proof.
Lemma finite_seqP {T : eqType} A :
finite_set A <-> exists s : seq T, A = [set` s].
Proof.
Lemma finite_seq {T : eqType} (s : seq T) : finite_set [set` s].
Proof.
Lemma finite_fset {T : choiceType} (X : {fset T}) : finite_set [set` X].
Proof.
Lemma finite_finpred {T : finType} {pT : predType T} (P : pT) :
finite_set [set` P].
Proof.
Hint Extern 0 (finite_set [set` _]) => solve [apply: finite_finpred] : core.
Lemma finite_finset {T : finType} {X : set T} : finite_set X.
#[global] Hint Resolve finite_finset : core.
Lemma finite_set_countable T (A : set T) : finite_set A -> countable A.
Proof.
Lemma infiniteP T (A : set T) : infinite_set A <-> [set: nat] #<= A.
Proof.
elim/Ppointed: T => T in A *.
by rewrite !emptyE; split=> // /(congr1 (@^~ 0%N))/=; rewrite propeqE => -[].
split=> [Ainfinite| + /finite_setP[n eqAI]]; last first.
rewrite (card_le_eqr eqAI) => le_nat_n.
suff: `I_n.+1 #<= `I_n by rewrite card_le_II ltnn.
exact: card_le_trans (subset_card_le _) le_nat_n.
have /all_sig2[f Af fX] : forall X : {fset T}, {x | x \in A & x \notin X}.
move=> X; apply/sig2W; apply: contra_notP Ainfinite => nAX; apply/finite_fsetP.
exists [fset x in X | x \in A]%fset; rewrite eqEsubset; split; last first.
by move=> x/=; rewrite !inE => /andP[_]; rewrite inE.
move=> x Ax /=; rewrite !inE/=; apply/andP; split; rewrite ?inE//.
by apply: contra_notT nAX => xNX; exists x; rewrite ?inE.
do [under [forall x : {fset _}, _]eq_forall do rewrite inE] in Af *.
suff [g gE] : exists g : nat -> T,
forall n, g n = f [fset g k | k in iota 0 n]%fset.
have /Pinj[h hE] : {in setT &, injective g}.
move=> i j _ _; apply: contra_eq; wlog lt_ij : i j / (i < j)%N => [hwlog|_].
by case: ltngtP => // ij _; [|rewrite eq_sym];
apply: hwlog=> //; rewrite lt_eqF//.
rewrite [g j]gE; set X := (X in f X); have := fX X.
by apply: contraNneq => <-; apply/imfsetP; exists i => //=; rewrite mem_iota.
have/injPfun[i _] : {homo h : x / setT x >-> A x} by move=> i; rewrite -hE gE.
by apply/pcard_leP; squash i.
pose g := fix g n k := if n isn't n'.+1 then f fset0
else f [fset g n' i | i in iota 0 k]%fset.
exists (fun n => g n n) => n.
suff {n} gn n k : (k <= n)%N -> g n k = f [fset g k k | k in iota 0 k]%fset.
by rewrite gn//; congr f; apply/fsetP => k.
have [m] := ubnP n; elim: m n k => //= m IHm [|n] k /=.
rewrite leqn0 => _ /eqP->/=.
congr f; apply/fsetP => x; rewrite !inE; symmetry.
by apply/imfsetP => /= -[].
rewrite ltnS => ltmn lekSn /=; congr f; apply/fsetP => i.
by apply/imfsetP/imfsetP => /= -[j]; rewrite mem_iota/= => jk ->;
exists j; rewrite ?mem_iota//= ?add0n ?IHm//;
by [rewrite (leq_trans jk)// (leq_trans lekSn)|rewrite -ltnS (leq_trans jk)].
Qed.
by rewrite !emptyE; split=> // /(congr1 (@^~ 0%N))/=; rewrite propeqE => -[].
split=> [Ainfinite| + /finite_setP[n eqAI]]; last first.
rewrite (card_le_eqr eqAI) => le_nat_n.
suff: `I_n.+1 #<= `I_n by rewrite card_le_II ltnn.
exact: card_le_trans (subset_card_le _) le_nat_n.
have /all_sig2[f Af fX] : forall X : {fset T}, {x | x \in A & x \notin X}.
move=> X; apply/sig2W; apply: contra_notP Ainfinite => nAX; apply/finite_fsetP.
exists [fset x in X | x \in A]%fset; rewrite eqEsubset; split; last first.
by move=> x/=; rewrite !inE => /andP[_]; rewrite inE.
move=> x Ax /=; rewrite !inE/=; apply/andP; split; rewrite ?inE//.
by apply: contra_notT nAX => xNX; exists x; rewrite ?inE.
do [under [forall x : {fset _}, _]eq_forall do rewrite inE] in Af *.
suff [g gE] : exists g : nat -> T,
forall n, g n = f [fset g k | k in iota 0 n]%fset.
have /Pinj[h hE] : {in setT &, injective g}.
move=> i j _ _; apply: contra_eq; wlog lt_ij : i j / (i < j)%N => [hwlog|_].
by case: ltngtP => // ij _; [|rewrite eq_sym];
apply: hwlog=> //; rewrite lt_eqF//.
rewrite [g j]gE; set X := (X in f X); have := fX X.
by apply: contraNneq => <-; apply/imfsetP; exists i => //=; rewrite mem_iota.
have/injPfun[i _] : {homo h : x / setT x >-> A x} by move=> i; rewrite -hE gE.
by apply/pcard_leP; squash i.
pose g := fix g n k := if n isn't n'.+1 then f fset0
else f [fset g n' i | i in iota 0 k]%fset.
exists (fun n => g n n) => n.
suff {n} gn n k : (k <= n)%N -> g n k = f [fset g k k | k in iota 0 k]%fset.
by rewrite gn//; congr f; apply/fsetP => k.
have [m] := ubnP n; elim: m n k => //= m IHm [|n] k /=.
rewrite leqn0 => _ /eqP->/=.
congr f; apply/fsetP => x; rewrite !inE; symmetry.
by apply/imfsetP => /= -[].
rewrite ltnS => ltmn lekSn /=; congr f; apply/fsetP => i.
by apply/imfsetP/imfsetP => /= -[j]; rewrite mem_iota/= => jk ->;
exists j; rewrite ?mem_iota//= ?add0n ?IHm//;
by [rewrite (leq_trans jk)// (leq_trans lekSn)|rewrite -ltnS (leq_trans jk)].
Qed.
Lemma finite_setPn T (A : set T) : finite_set A <-> ~ ([set: nat] #<= A).
Lemma card_le_finite T U (A : set T) (B : set U) :
A #<= B -> finite_set B -> finite_set A.
Proof.
Lemma sub_finite_set T (A B : set T) : A `<=` B ->
finite_set B -> finite_set A.
Proof.
Lemma finite_set_leP T (A : set T) : finite_set A <-> exists n, A #<= `I_n.
Proof.
split=> [[n /card_eqPle[]]|[n leAn]]; first by exists n.
by apply: card_le_finite leAn _; exists n.
Qed.
by apply: card_le_finite leAn _; exists n.
Qed.
Lemma card_ge_preimage {T U} (B : set U) (f : T -> U) :
{in f @^-1` B &, injective f} -> f @^-1` B #<= B.
Proof.
move=> /Pinj[g eqg]; rewrite -(card_le_eql (card_image g)) -eqg.
by apply: subset_card_le; apply: image_preimage_subset.
Qed.
by apply: subset_card_le; apply: image_preimage_subset.
Qed.
Corollary finite_preimage {T U} (B : set U) (f : T -> U) :
{in f @^-1` B &, injective f} -> finite_set B -> finite_set (f @^-1` B).
Proof.
Lemma eq_finite_set T U (A : set T) (B : set U) :
A #= B -> finite_set A = finite_set B.
Proof.
Lemma card_le_setD T (A B : set T) : A `\` B #<= A.
Proof.
Lemma finite_image T T' A (f : T -> T') : finite_set A -> finite_set (f @` A).
Proof.
Lemma finite_set1 T (x : T) : finite_set [set x].
Proof.
Lemma finite_setD T (A B : set T) : finite_set A -> finite_set (A `\` B).
Proof.
Lemma finite_setU T (A B : set T) :
finite_set (A `|` B) = (finite_set A /\ finite_set B).
Proof.
pose fP := @finite_fsetP {classic T}; rewrite propeqE; split.
by move=> finAUB; split; apply: sub_finite_set finAUB.
by case=> /fP[X->]/fP[Y->]; apply/fP; exists (X `|` Y)%fset; rewrite set_fsetU.
Qed.
by move=> finAUB; split; apply: sub_finite_set finAUB.
by case=> /fP[X->]/fP[Y->]; apply/fP; exists (X `|` Y)%fset; rewrite set_fsetU.
Qed.
Lemma finite_set2 T (x y : T) : finite_set [set x; y].
Proof.
Lemma finite_set3 T (x y z : T) : finite_set [set x; y; z].
Proof.
Lemma finite_set4 T (x y z t : T) : finite_set [set x; y; z; t].
Proof.
Lemma finite_set5 T (x y z t u : T) : finite_set [set x; y; z; t; u].
Proof.
Lemma finite_set6 T (x y z t u v : T) : finite_set [set x; y; z; t; u; v].
Proof.
Lemma finite_set7 T (x y z t u v w : T) : finite_set [set x; y; z; t; u; v; w].
Proof.
Lemma finite_setI T (A B : set T) :
(finite_set A \/ finite_set B) -> finite_set (A `&` B).
Proof.
Lemma finite_setIl T (A B : set T) : finite_set A -> finite_set (A `&` B).
Proof.
Lemma finite_setIr T (A B : set T) : finite_set B -> finite_set (A `&` B).
Proof.
Lemma finite_setX T T' (A : set T) (B : set T') :
finite_set A -> finite_set B -> finite_set (A `*` B).
Proof.
elim/Pchoice: T => T in A *; elim/Pchoice: T' => T' in B *.
move=> /finite_fsetP[{}A ->] /finite_fsetP[{}B ->].
apply/finite_fsetP; exists (A `*` B)%fset; apply/predeqP => x.
by split; rewrite /= inE => /andP.
Qed.
move=> /finite_fsetP[{}A ->] /finite_fsetP[{}B ->].
apply/finite_fsetP; exists (A `*` B)%fset; apply/predeqP => x.
by split; rewrite /= inE => /andP.
Qed.
Notation finite_setM := finite_setX (only parsing).
Lemma finite_image2 [aT bT rT : Type] [A : set aT] [B : set bT]
(f : aT -> bT -> rT) :
finite_set A -> finite_set B -> finite_set [set f x y | x in A & y in B].
Proof.
Lemma finite_image11 [xT aT bT rT : Type] [X : set xT]
(g : aT -> bT -> rT) (fa : xT -> aT) (fb : xT -> bT) :
finite_set (fa @` X) -> finite_set (fb @` X) ->
finite_set [set g (fa x) (fb x) | x in X].
Proof.
move=> /(finite_image2 g) /[apply]; apply: sub_finite_set; rewrite image2E.
by move=> r/= [x Xx <-]; exists (fa x, fb x) => //; split; exists x.
Qed.
by move=> r/= [x Xx <-]; exists (fa x, fb x) => //; split; exists x.
Qed.
Definition fset_set (T : choiceType) (A : set T) :=
if pselect (finite_set A) is left Afin
then projT1 (cid (finite_fsetP.1 Afin)) else fset0.
Lemma fset_setK (T : choiceType) (A : set T) : finite_set A ->
[set` fset_set A] = A.
Lemma in_fset_set (T : choiceType) (A : set T) : finite_set A ->
fset_set A =i A.
Lemma fset_set_sub (T : choiceType) (A B : set T) :
finite_set A -> finite_set B -> A `<=` B = (fset_set A `<=` fset_set B)%fset.
Proof.
move=> finA finB; apply/propext; split=> [AB|/fsubsetP AB t].
by apply/fsubsetP => t; rewrite in_fset_set// in_fset_set// 2!inE => /AB.
by have := AB t; rewrite !in_fset_set// !inE.
Qed.
by apply/fsubsetP => t; rewrite in_fset_set// in_fset_set// 2!inE => /AB.
by have := AB t; rewrite !in_fset_set// !inE.
Qed.
Lemma fset_set_set0 (T : choiceType) (A : set T) : finite_set A ->
fset_set A = fset0 -> A = set0.
Proof.
Lemma fset_set0 {T : choiceType} : fset_set (set0 : set T) = fset0.
Proof.
Lemma fset_set1 {T : choiceType} (x : T) : fset_set [set x] = [fset x]%fset.
Lemma fset_setU {T : choiceType} (A B : set T) :
finite_set A -> finite_set B ->
fset_set (A `|` B) = (fset_set A `|` fset_set B)%fset.
Proof.
move=> fA fB; apply/fsetP=> x.
rewrite ?(inE, in_fset_set)//; last by rewrite finite_setU.
by apply/idP/orP; rewrite ?inE.
Qed.
rewrite ?(inE, in_fset_set)//; last by rewrite finite_setU.
by apply/idP/orP; rewrite ?inE.
Qed.
Lemma fset_setI {T : choiceType} (A B : set T) :
finite_set A -> finite_set B ->
fset_set (A `&` B) = (fset_set A `&` fset_set B)%fset.
Proof.
move=> fA fB; apply/fsetP=> x.
rewrite ?(inE, in_fset_set)//; last by apply: finite_setI; left.
by apply/idP/andP; rewrite ?inE.
Qed.
rewrite ?(inE, in_fset_set)//; last by apply: finite_setI; left.
by apply/idP/andP; rewrite ?inE.
Qed.
Lemma fset_setU1 {T : choiceType} (x : T) (A : set T) :
finite_set A -> fset_set (x |` A) = (x |` fset_set A)%fset.
Lemma fset_setD {T : choiceType} (A B : set T) :
finite_set A -> finite_set B ->
fset_set (A `\` B) = (fset_set A `\` fset_set B)%fset.
Proof.
move=> fA fB; apply/fsetP=> x.
rewrite ?(inE, in_fset_set)//; last exact: finite_setD.
by apply/idP/andP; rewrite ?inE => -[]; rewrite ?notin_setE.
Qed.
rewrite ?(inE, in_fset_set)//; last exact: finite_setD.
by apply/idP/andP; rewrite ?inE => -[]; rewrite ?notin_setE.
Qed.
Lemma fset_setD1 {T : choiceType} (x : T) (A : set T) :
finite_set A -> fset_set (A `\ x) = (fset_set A `\ x)%fset.
Lemma fset_setX {T1 T2 : choiceType} (A : set T1) (B : set T2) :
finite_set A -> finite_set B ->
fset_set (A `*` B) = (fset_set A `*` fset_set B)%fset.
Proof.
move=> Afin Bfin; have ABfin : finite_set (A `*` B) by exact: finite_setX.
apply/fsetP => i; apply/idP/idP; rewrite !(inE, in_fset_set)//=.
by move=> [/mem_set-> /mem_set->].
by move=> /andP[]; rewrite !inE.
Qed.
apply/fsetP => i; apply/idP/idP; rewrite !(inE, in_fset_set)//=.
by move=> [/mem_set-> /mem_set->].
by move=> /andP[]; rewrite !inE.
Qed.
Notation fset_setM := fset_setX (only parsing).
Definition fst_fset (T1 T2 : choiceType) (A : {fset (T1 * T2)}) : {fset T1} :=
[fset x.1 | x in A]%fset.
Definition snd_fset (T1 T2 : choiceType) (A : {fset (T1 * T2)}) : {fset T2} :=
[fset x.2 | x in A]%fset.
Notation "A .`1" := (fst_fset A) : fset_scope.
Notation "A .`2" := (snd_fset A) : fset_scope.
Lemma finite_set_fst (T1 T2 : choiceType) (A : set (T1 * T2)) :
finite_set A -> finite_set A.`1.
Proof.
move=> /finite_fsetP[B A_B]; apply/finite_fsetP; exists (B.`1)%fset.
by apply/seteqP; split=> [x/= [y]|_/= /imfsetP[[x1 x2]/= +] ->]; rewrite A_B;
[move=> xyB; apply/imfsetP; exists (x, y)|move=> ?; exists x2].
Qed.
by apply/seteqP; split=> [x/= [y]|_/= /imfsetP[[x1 x2]/= +] ->]; rewrite A_B;
[move=> xyB; apply/imfsetP; exists (x, y)|move=> ?; exists x2].
Qed.
Lemma finite_set_snd (T1 T2 : choiceType) (A : set (T1 * T2)) :
finite_set A -> finite_set A.`2.
Proof.
move=> /finite_fsetP[B A_B]; apply/finite_fsetP; exists (B.`2)%fset.
apply/seteqP; split=> [y/= [x]|_/= /imfsetP[[x1 x2]/= +] ->]; rewrite A_B;
by [move=> xyB; apply/imfsetP; exists (x, y)|move=> ?; exists x1].
Qed.
apply/seteqP; split=> [y/= [x]|_/= /imfsetP[[x1 x2]/= +] ->]; rewrite A_B;
by [move=> xyB; apply/imfsetP; exists (x, y)|move=> ?; exists x1].
Qed.
Lemma bigcup_finite {I T} (D : set I) (F : I -> set T) :
finite_set D -> (forall i, D i -> finite_set (F i)) ->
finite_set (\bigcup_(i in D) F i).
Proof.
elim/Pchoice: I => I in D F *.
elim/Ppointed: T => T in F *; first by rewrite emptyE.
move=> Dfin Ffin; pose G (i : fset_set D) := fset_set (F (val i)).
suff: (\bigcup_(i in D) F i #<= [set: {i & G i}])%card.
by move=> /card_le_finite; apply; apply: finite_finset.
apply/pcard_geP/surjPex.
exists (fun (k : {i : fset_set D & G i}) => val (projT2 k)).
move=> y [i Di Fky]/=.
have Dk : i \in fset_set D by rewrite in_fset_set// inE.
pose k : fset_set D := [` Dk]%fset.
have Gy : y \in G k by rewrite in_fset_set ?inE//; apply: Ffin.
by exists (Tagged G [` Gy]%fset).
Qed.
elim/Ppointed: T => T in F *; first by rewrite emptyE.
move=> Dfin Ffin; pose G (i : fset_set D) := fset_set (F (val i)).
suff: (\bigcup_(i in D) F i #<= [set: {i & G i}])%card.
by move=> /card_le_finite; apply; apply: finite_finset.
apply/pcard_geP/surjPex.
exists (fun (k : {i : fset_set D & G i}) => val (projT2 k)).
move=> y [i Di Fky]/=.
have Dk : i \in fset_set D by rewrite in_fset_set// inE.
pose k : fset_set D := [` Dk]%fset.
have Gy : y \in G k by rewrite in_fset_set ?inE//; apply: Ffin.
by exists (Tagged G [` Gy]%fset).
Qed.
Lemma trivIset_sum_card (T : choiceType) (F : nat -> set T) n :
(forall n, finite_set (F n)) -> trivIset [set: nat] F ->
(\sum_(i < n) #|` fset_set (F i)| =
#|` fset_set (\big[setU/set0]_(k < n) F k)|)%N.
Proof.
move=> finF tF; elim: n => [|n ih]; first by rewrite !big_ord0 fset_set0.
rewrite big_ord_recr//= ih big_ord_recr/= fset_setU//; last first.
by rewrite -bigcup_mkord; exact: bigcup_finite.
rewrite cardfsU [X in (_ - X)%N](_ : _ = O) ?subn0// ?EFinD ?natrD//.
apply/eqP; rewrite cardfs_eq0 -fset_setI//; last first.
by rewrite -bigcup_mkord; exact: bigcup_finite.
rewrite (@trivIset_bigsetUI _ xpredT)// ?fset_set0//.
by rewrite [X in trivIset X F](_ : _ = [set: nat])//; exact/seteqP.
Qed.
rewrite big_ord_recr//= ih big_ord_recr/= fset_setU//; last first.
by rewrite -bigcup_mkord; exact: bigcup_finite.
rewrite cardfsU [X in (_ - X)%N](_ : _ = O) ?subn0// ?EFinD ?natrD//.
apply/eqP; rewrite cardfs_eq0 -fset_setI//; last first.
by rewrite -bigcup_mkord; exact: bigcup_finite.
rewrite (@trivIset_bigsetUI _ xpredT)// ?fset_set0//.
by rewrite [X in trivIset X F](_ : _ = [set: nat])//; exact/seteqP.
Qed.
Lemma finite_setXR (T T' : choiceType) (A : set T) (B : T -> set T') :
finite_set A -> (forall x, A x -> finite_set (B x)) -> finite_set (A `*`` B).
Proof.
move=> Afin Bfin; rewrite -bigcupX1l.
by apply: bigcup_finite => // i Ai; exact/finite_setX/Bfin.
Qed.
by apply: bigcup_finite => // i Ai; exact/finite_setX/Bfin.
Qed.
Notation finite_setMR := finite_setXR (only parsing).
Lemma finite_setXL (T T' : choiceType) (A : T' -> set T) (B : set T') :
(forall x, B x -> finite_set (A x)) -> finite_set B -> finite_set (A ``*` B).
Proof.
move=> Afin Bfin; rewrite -bigcupX1r.
by apply: bigcup_finite => // i Ai; apply/finite_setX => //; exact: Afin.
Qed.
by apply: bigcup_finite => // i Ai; apply/finite_setX => //; exact: Afin.
Qed.
Notation finite_setML := finite_setXL (only parsing).
Lemma fset_set_II n : fset_set `I_n = [fset val i | i in 'I_n]%fset.
Proof.
Lemma set_fsetK (T : choiceType) (A : {fset T}) : fset_set [set` A] = A.
Proof.
Lemma fset_set_image {T U : choiceType} (f : T -> U) (A : set T) :
finite_set A -> fset_set (f @` A) = (f @` fset_set A)%fset.
Proof.
move=> Afset; apply/fsetP=> i.
rewrite !in_fset_set; last exact: finite_image.
apply/idP/imfsetP; rewrite !inE/=.
by move=> [x Ax <-]; exists x; rewrite ?in_fset_set ?inE.
by move=> [x + ->]; rewrite in_fset_set// inE; exists x.
Qed.
rewrite !in_fset_set; last exact: finite_image.
apply/idP/imfsetP; rewrite !inE/=.
by move=> [x Ax <-]; exists x; rewrite ?in_fset_set ?inE.
by move=> [x + ->]; rewrite in_fset_set// inE; exists x.
Qed.
Lemma fset_set_inj {T : choiceType} (A B : set T) :
finite_set A -> finite_set B -> fset_set A = fset_set B -> A = B.
Lemma bigsetU_fset_set T (I : choiceType) (A : set I) (F : I -> set T) :
finite_set A -> \big[setU/set0]_(i <- fset_set A) F i =\bigcup_(i in A) F i.
Proof.
Lemma __deprecated__bigcup_fset_set T (I : choiceType) (A : set I) (F : I -> set T) :
finite_set A -> \bigcup_(i in A) F i = \big[setU/set0]_(i <- fset_set A) F i.
Proof.
Notation bigcup_fset_set := __deprecated__bigcup_fset_set (only parsing).
Lemma bigsetU_fset_set_cond T (I : choiceType) (A : set I) (F : I -> set T)
(P : pred I) : finite_set A ->
\big[setU/set0]_(i <- fset_set A | P i) F i = \bigcup_(i in A `&` P) F i.
Proof.
Lemma __deprecated__bigcup_fset_set_cond T (I : choiceType) (A : set I) (F : I -> set T)
(P : pred I) : finite_set A ->
\bigcup_(i in A `&` P) F i = \big[setU/set0]_(i <- fset_set A | P i) F i.
Proof.
Notation bigcup_fset_set_cond := __deprecated__bigcup_fset_set_cond (only parsing).
Lemma bigsetI_fset_set T (I : choiceType) (A : set I) (F : I -> set T) :
finite_set A -> \big[setI/setT]_(i <- fset_set A) F i =\bigcap_(i in A) F i.
Proof.
Lemma __deprecated__bigcap_fset_set T (I : choiceType) (A : set I) (F : I -> set T) :
finite_set A -> \bigcap_(i in A) F i = \big[setI/setT]_(i <- fset_set A) F i.
Proof.
Notation bigcap_fset_set := __deprecated__bigcap_fset_set (only parsing).
Lemma bigsetI_fset_set_cond T (I : choiceType) (A : set I) (F : I -> set T)
(P : pred I) : finite_set A ->
\big[setI/setT]_(i <- fset_set A | P i) F i = \bigcap_(i in A `&` P) F i.
Proof.
Lemma super_bij T U (X A : set T) (Y B : set U) (f : {bij X >-> Y}) :
X `<=` A -> Y `<=` B -> A `\` X #= B `\` Y ->
exists g : {bij A >-> B}, {in X, g =1 f}.
Proof.
elim/Ppointed: U => U in Y B f *.
rewrite !emptyE in f * => XA _; rewrite setD_eq0 => AX.
by suff /seteqP->// : A `<=>` X by exists f.
move=> XA YB /pcard_eqP[g].
rewrite -(joinIB X A) -(joinIB Y B) !meetEset.
have /disj_set2P AX : (A `&` X) `&` (A `\` X) = set0 by apply: meetIB.
have /disj_set2P BY : (B `&` Y) `&` (B `\` Y) = set0 by apply: meetIB.
rewrite !(setIidr XA) !(setIidr YB) in AX BY *.
by exists [bij of glue AX BY f g] => x /= xX; rewrite glue1.
Qed.
rewrite !emptyE in f * => XA _; rewrite setD_eq0 => AX.
by suff /seteqP->// : A `<=>` X by exists f.
move=> XA YB /pcard_eqP[g].
rewrite -(joinIB X A) -(joinIB Y B) !meetEset.
have /disj_set2P AX : (A `&` X) `&` (A `\` X) = set0 by apply: meetIB.
have /disj_set2P BY : (B `&` Y) `&` (B `\` Y) = set0 by apply: meetIB.
rewrite !(setIidr XA) !(setIidr YB) in AX BY *.
by exists [bij of glue AX BY f g] => x /= xX; rewrite glue1.
Qed.
Lemma card_eq_fsetP {T : choiceType} {A : {fset T}} {n} :
reflect (#|` A| = n) ([set` A] #= `I_n).
Proof.
elim/choicePpointed: T => T in A *.
rewrite -{1}[A]set_fsetK !emptyE fset_set0 cardfs0.
by apply: (iffP eqP) => [/IIn_eq0->//|<-]; rewrite II0.
rewrite (card_eqr card_II) card_eq_sym.
apply: (iffP pcard_eqP) => [[f]|]; last first.
rewrite cardfE => eqAn.
by squash (set_val \o finset_val \o enum_val \o cast_ord (esym eqAn)).
suff -> : A = [fset f i | i in 'I_n]%fset by rewrite card_imfset ?size_enum_ord.
apply/fsetP => x; apply/idP/imfsetP => /= [xA|[i _ ->]].
by have [i _ <-] := 'surj_f xA; exists i.
by have /(_ i I) := 'funS_f.
Qed.
rewrite -{1}[A]set_fsetK !emptyE fset_set0 cardfs0.
by apply: (iffP eqP) => [/IIn_eq0->//|<-]; rewrite II0.
rewrite (card_eqr card_II) card_eq_sym.
apply: (iffP pcard_eqP) => [[f]|]; last first.
rewrite cardfE => eqAn.
by squash (set_val \o finset_val \o enum_val \o cast_ord (esym eqAn)).
suff -> : A = [fset f i | i in 'I_n]%fset by rewrite card_imfset ?size_enum_ord.
apply/fsetP => x; apply/idP/imfsetP => /= [xA|[i _ ->]].
by have [i _ <-] := 'surj_f xA; exists i.
by have /(_ i I) := 'funS_f.
Qed.
Lemma card_fset_set {T : choiceType} (A : set T) n :
A #= `I_n -> #|`fset_set A| = n.
Proof.
Lemma geq_card_fset_set {T : choiceType} (A : set T) n :
A #<= `I_n -> (#|`fset_set A| <= n)%N.
Proof.
move=> An; have /finite_setP[m Am] : finite_set A
by apply/finite_set_leP; exists n.
by rewrite (card_fset_set Am) -card_le_II -(card_le_eql Am).
Qed.
by apply/finite_set_leP; exists n.
by rewrite (card_fset_set Am) -card_le_II -(card_le_eql Am).
Qed.
Lemma leq_card_fset_set {T : choiceType} (A : set T) n :
finite_set A -> A #>= `I_n -> (#|`fset_set A| >= n)%N.
Proof.
Lemma infinite_set_fset {T : choiceType} (A : set T) (n : nat) :
infinite_set A ->
exists2 B : {fset T}, [set` B] `<=` A & (#|` B| >= n)%N.
Proof.
elim/choicePpointed: T => T in A *; first by rewrite emptyE.
move=> /infiniteP/ppcard_leP[f]; exists (fset_set [set f i | i in `I_n]).
rewrite fset_setK//; last exact: finite_image.
by apply: subset_trans (fun_image_sub f); apply: image_subset.
rewrite fset_set_image// card_imfset//= fset_set_II/=.
by rewrite card_imfset//= ?size_enum_ord//; apply: val_inj.
Qed.
move=> /infiniteP/ppcard_leP[f]; exists (fset_set [set f i | i in `I_n]).
rewrite fset_setK//; last exact: finite_image.
by apply: subset_trans (fun_image_sub f); apply: image_subset.
rewrite fset_set_image// card_imfset//= fset_set_II/=.
by rewrite card_imfset//= ?size_enum_ord//; apply: val_inj.
Qed.
Lemma infinite_set_fsetP {T : choiceType} (A : set T) :
infinite_set A <->
forall n, exists2 B : {fset T}, [set` B] `<=` A & (#|` B| >= n)%N.
Proof.
split; first by move=> ? ?; apply: infinite_set_fset.
elim/choicePpointed: T => T in A *.
move=> /(_ 1%N)[B _]; rewrite cardfs_gt0 => /fset0Pn[x xB].
by have: [set` B] x by []; rewrite emptyE.
move=> Bge /finite_setP[n An]; have [B BA] := Bge n.+1.
apply/negP; rewrite -leqNgt -(card_fset_set An) fsubset_leq_card//.
apply/fsubsetP => x /BA; rewrite in_fset_set ?inE//.
by apply/finite_setP; exists n.
Qed.
elim/choicePpointed: T => T in A *.
move=> /(_ 1%N)[B _]; rewrite cardfs_gt0 => /fset0Pn[x xB].
by have: [set` B] x by []; rewrite emptyE.
move=> Bge /finite_setP[n An]; have [B BA] := Bge n.+1.
apply/negP; rewrite -leqNgt -(card_fset_set An) fsubset_leq_card//.
apply/fsubsetP => x /BA; rewrite in_fset_set ?inE//.
by apply/finite_setP; exists n.
Qed.
Lemma fcard_eq {T T' : choiceType} (A : set T) (B : set T') :
finite_set A -> finite_set B ->
reflect (#|`fset_set A| = #|`fset_set B|) (A #= B).
Proof.
move=> /finite_setP/cid[n An] /finite_setP/cid[m Bm].
rewrite (card_fset_set An) (card_fset_set Bm).
by rewrite (card_eql An) (card_eqr Bm); apply: card_eq_II.
Qed.
rewrite (card_fset_set An) (card_fset_set Bm).
by rewrite (card_eql An) (card_eqr Bm); apply: card_eq_II.
Qed.
Lemma card_IID {n k} : `I_n `\` `I_k #= `I_(n - k)%N.
Proof.
apply/fcard_eq => //; first exact: finite_setD.
rewrite fset_setD//= cardfsD/= -fset_setI// setI_II.
rewrite !fset_set_II !card_imfset// /= !size_enum_ord.
by case: leqP; rewrite // subnn => /eqP->.
Qed.
rewrite fset_setD//= cardfsD/= -fset_setI// setI_II.
rewrite !fset_set_II !card_imfset// /= !size_enum_ord.
by case: leqP; rewrite // subnn => /eqP->.
Qed.
Lemma finite_set_bij T (A : set T) n S : A != set0 ->
A #= `I_n -> S `<=` A ->
exists (f : {bij `I_n >-> A}) k, (k <= n)%N /\ `I_n `&` (f @^-1` S) = `I_k.
Proof.
elim/Ppointed: T => T in A S *; first by rewrite !emptyE eqxx.
move=> AN0 An SA; have [k kn Sk] : exists2 k, (k <= n)%N & S #= `I_k.
have /finite_setP[k Sk]: finite_set S by apply: sub_finite_set SA _; exists n.
exists k => //; rewrite -card_le_II.
by rewrite -(card_le_eqr An) -(card_le_eql Sk); apply: subset_card_le.
have /card_esym/ppcard_eqP[f] := Sk.
have eqAS : A `\` S #= `I_n `\` `I_k.
have An' := An; have Sk' := Sk.
do [have /finite_fsetP[{An'}A ->] : finite_set A by exists n] in An AN0 SA *.
do [have /finite_fsetP[{Sk'}S ->] : finite_set S by exists k] in Sk f SA *.
have [/card_eq_fsetP {}An /card_eq_fsetP {}Sk] := (An, Sk).
rewrite -set_fsetD (card_eqr card_IID); apply/card_eq_fsetP.
by rewrite cardfsD (fsetIidPr _) ?An ?Sk //; apply/fsubsetP.
case: (super_bij [bij of f^-1] SA _ eqAS) => [x /= /leq_trans->// | g].
have [{}g ->] := pPbij 'bij_g => /= gE.
exists [bij of g^-1], k; split=> //=; rewrite -inv_sub_image //= invV.
by under eq_imagel do rewrite /= gE ?inE//; rewrite image_eq.
Qed.
move=> AN0 An SA; have [k kn Sk] : exists2 k, (k <= n)%N & S #= `I_k.
have /finite_setP[k Sk]: finite_set S by apply: sub_finite_set SA _; exists n.
exists k => //; rewrite -card_le_II.
by rewrite -(card_le_eqr An) -(card_le_eql Sk); apply: subset_card_le.
have /card_esym/ppcard_eqP[f] := Sk.
have eqAS : A `\` S #= `I_n `\` `I_k.
have An' := An; have Sk' := Sk.
do [have /finite_fsetP[{An'}A ->] : finite_set A by exists n] in An AN0 SA *.
do [have /finite_fsetP[{Sk'}S ->] : finite_set S by exists k] in Sk f SA *.
have [/card_eq_fsetP {}An /card_eq_fsetP {}Sk] := (An, Sk).
rewrite -set_fsetD (card_eqr card_IID); apply/card_eq_fsetP.
by rewrite cardfsD (fsetIidPr _) ?An ?Sk //; apply/fsubsetP.
case: (super_bij [bij of f^-1] SA _ eqAS) => [x /= /leq_trans->// | g].
have [{}g ->] := pPbij 'bij_g => /= gE.
exists [bij of g^-1], k; split=> //=; rewrite -inv_sub_image //= invV.
by under eq_imagel do rewrite /= gE ?inE//; rewrite image_eq.
Qed.
#[deprecated(note="use countable0 instead")]
Notation countable_set0 := countable0 (only parsing).
Lemma countable1 T (x : T) : countable [set x].
Proof.
Lemma countable_fset (T : choiceType) (X : {fset T}) : countable [set` X].
Proof.
Lemma countable_finpred (T : finType) (pT : predType T) (P : pT) : countable [set` P].
Proof.
Lemma eq_card_nat T (A : set T):
countable A -> ~ finite_set A -> A #= [set: nat].
Proof.
Lemma infinite_nat : ~ finite_set [set: nat].
Lemma infinite_prod_nat : infinite_set [set: nat * nat].
Proof.
Lemma card_nat2 : [set: nat * nat] #= [set: nat].
Proof.
HB.instance Definition _ := isPointed.Build rat 0.
Lemma infinite_rat : infinite_set [set: rat].
Proof.
apply/infiniteP/pcard_leTP/injPex; exists (GRing.natmul 1) => // m n _ _.
exact/Num.Theory.mulrIn/oner_neq0.
Qed.
exact/Num.Theory.mulrIn/oner_neq0.
Qed.
Lemma card_rat : [set: rat] #= [set: nat].
Proof.
Lemma choicePcountable {T : choiceType} : countable [set: T] ->
{T' : countType | T = T' :> Type}.
Proof.
Lemma eqPcountable {T : eqType} : countable [set: T] ->
{T' : countType | T = T' :> Type}.
Proof.
Lemma Pcountable {T : Type} : countable [set: T] ->
{T' : countType | T = T' :> Type}.
Proof.
Lemma bigcup_countable {I T} (D : set I) (F : I -> set T) :
countable D -> (forall i, D i -> countable (F i)) ->
countable (\bigcup_(i in D) F i).
Proof.
elim/Ppointed: T => T in F *; first by rewrite emptyE.
rewrite -(eq_countable (card_setT _)) => cD cF; rewrite bigcup_set_type.
set G := (fun i : D => F (val i)).
have {cF}cG i : countable (G i) by apply: cF; apply: set_valP.
move: (D : Type) cD G cG => {F I}_ /Pcountable[{}D ->] G cG.
suff: (\bigcup_i G i #<= [set: {i & G i}])%card.
have cGT i : countable [set: G i] by rewrite (eq_countable (card_setT _)).
have /all_sig[H GE] := fun i => Pcountable (cGT i).
by move=> /sub_countable->//; rewrite (eq_fun GE).
apply/pcard_geP/surjPex; exists (fun (k : {i & G i}) => val (projT2 k)).
by move=> x [i _] Gix/=; exists (Tagged G (SigSub (mem_set Gix))).
Qed.
rewrite -(eq_countable (card_setT _)) => cD cF; rewrite bigcup_set_type.
set G := (fun i : D => F (val i)).
have {cF}cG i : countable (G i) by apply: cF; apply: set_valP.
move: (D : Type) cD G cG => {F I}_ /Pcountable[{}D ->] G cG.
suff: (\bigcup_i G i #<= [set: {i & G i}])%card.
have cGT i : countable [set: G i] by rewrite (eq_countable (card_setT _)).
have /all_sig[H GE] := fun i => Pcountable (cGT i).
by move=> /sub_countable->//; rewrite (eq_fun GE).
apply/pcard_geP/surjPex; exists (fun (k : {i & G i}) => val (projT2 k)).
by move=> x [i _] Gix/=; exists (Tagged G (SigSub (mem_set Gix))).
Qed.
Lemma countableXR T T' (A : set T) (B : T -> set T') :
countable A -> (forall i, A i -> countable (B i)) -> countable (A `*`` B).
Proof.
elim/Ppointed: T => T in A B *; first by rewrite emptyE -bigcupX1l bigcup_set0.
elim/Ppointed: T' => T' in B *.
by rewrite -bigcupX1l bigcup0// => i; rewrite emptyE setX0.
move=> Ac Bc; rewrite -bigcupX1l bigcup_countable// => i Ai.
have /ppcard_leP[f] := Bc i Ai; apply/pcard_geP/surjPex.
exists (fun k => (i, f^-1%FUN k)) => -[_ j]/= [-> dj].
by exists (f j) => //=; rewrite funK ?inE.
Qed.
elim/Ppointed: T' => T' in B *.
by rewrite -bigcupX1l bigcup0// => i; rewrite emptyE setX0.
move=> Ac Bc; rewrite -bigcupX1l bigcup_countable// => i Ai.
have /ppcard_leP[f] := Bc i Ai; apply/pcard_geP/surjPex.
exists (fun k => (i, f^-1%FUN k)) => -[_ j]/= [-> dj].
by exists (f j) => //=; rewrite funK ?inE.
Qed.
Notation countableMR := countableXR (only parsing).
Lemma countableX T1 T2 (D1 : set T1) (D2 : set T2) :
countable D1 -> countable D2 -> countable (D1 `*` D2).
Proof.
Notation countableM := countableX (only parsing).
Lemma countableXL T T' (A : T' -> set T) (B : set T') :
countable B -> (forall i, B i -> countable (A i)) -> countable (A ``*` B).
Proof.
move=> Bc Ac; rewrite -bigcupX1r; apply: bigcup_countable => // i Bi.
by apply: countableX => //; exact: Ac.
Qed.
by apply: countableX => //; exact: Ac.
Qed.
Notation countableML := countableXL (only parsing).
Lemma infiniteXRl T T' (A : set T) (B : T -> set T') :
infinite_set A -> (forall i, B i !=set0) -> infinite_set (A `*`` B).
Proof.
Notation infiniteMRl := infiniteXRl (only parsing).
Lemma cardXR_eq_nat T T' (A : set T) (B : T -> set T') :
(A #= [set: nat] -> (forall i, countable (B i) /\ B i !=set0) ->
A `*`` B #= [set: nat])%card.
Proof.
rewrite !card_eq_le => /andP[Acnt /infiniteP Ainfty] /all_and2[Bcnt Bn0].
by rewrite [(_ #<= _)%card]countableXR//=; exact/infiniteP/infiniteXRl.
Qed.
by rewrite [(_ #<= _)%card]countableXR//=; exact/infiniteP/infiniteXRl.
Qed.
Notation cardMR_eq_nat := cardXR_eq_nat (only parsing).
Lemma eq_cardSP {T : Type} (A : set T) n :
reflect (exists2 x, A x & A `\ x #= `I_n) (A #= `I_n.+1).
Proof.
elim/Ppointed: T A => T A.
rewrite !emptyE; apply: (iffP eqP) => [|[]//].
by move=> /(congr1 (@^~ 0%N))/=; rewrite -falseE ltnS leq0n => /is_true_inj.
apply: (iffP idP) => [|[x Ax]].
move=> /ppcard_eqP[f]; exists (f^-1 n); first by apply: funS => /=.
by apply/card_esym/card_set_bijP; exists f^-1; apply: bij_II_D1.
move=> /pcard_eqP[f]; have [//|||g _] := @super_bij _ _ _ A _ `I_n.+1 f.
- by move=> k /=; apply: leq_trans.
- by rewrite setDD (card_eqr card_IID) subSnn// setIidr ?card_set1// => ? ->.
- by apply/pcard_eqP; squash g.
Qed.
rewrite !emptyE; apply: (iffP eqP) => [|[]//].
by move=> /(congr1 (@^~ 0%N))/=; rewrite -falseE ltnS leq0n => /is_true_inj.
apply: (iffP idP) => [|[x Ax]].
move=> /ppcard_eqP[f]; exists (f^-1 n); first by apply: funS => /=.
by apply/card_esym/card_set_bijP; exists f^-1; apply: bij_II_D1.
move=> /pcard_eqP[f]; have [//|||g _] := @super_bij _ _ _ A _ `I_n.+1 f.
- by move=> k /=; apply: leq_trans.
- by rewrite setDD (card_eqr card_IID) subSnn// setIidr ?card_set1// => ? ->.
- by apply/pcard_eqP; squash g.
Qed.
Lemma countable_n_subset {T : Type} (D : set T) n :
countable D -> countable [set A | A `<=` D /\ A #= `I_n].
Proof.
move=> Dcnt; elim: n => [|n].
rewrite [X in countable X]( _ : _ = [set set0])// eqEsubset II0.
by split=> A /=; [rewrite card_eq0; case=> _ /eqP | move->; split].
move=> /(countableX Dcnt); apply: sub_countable.
apply: card_le_trans (card_image_le (fun u => u.1 |` u.2) _).
apply: subset_card_le => B [BD] /eq_cardSP [x Bx BDx].
exists (x, B `\ x) => /=; last by apply: setDUK => ? ->.
by do !split=> //; [exact: BD | apply: subset_trans _ BD; apply: subDsetl].
Qed.
rewrite [X in countable X]( _ : _ = [set set0])// eqEsubset II0.
by split=> A /=; [rewrite card_eq0; case=> _ /eqP | move->; split].
move=> /(countableX Dcnt); apply: sub_countable.
apply: card_le_trans (card_image_le (fun u => u.1 |` u.2) _).
apply: subset_card_le => B [BD] /eq_cardSP [x Bx BDx].
exists (x, B `\ x) => /=; last by apply: setDUK => ? ->.
by do !split=> //; [exact: BD | apply: subset_trans _ BD; apply: subDsetl].
Qed.
Lemma countable_finite_subset {T : Type} (D : set T) :
countable D -> countable [set A | A `<=` D /\ finite_set A ].
Proof.
move=> Dcnt; suff -> : [set A | A `<=` D /\ finite_set A ] =
\bigcup_n [set A | A `<=` D /\ A #= `I_n ].
by apply: bigcup_countable => // ? _; exact: countable_n_subset.
rewrite eqEsubset; split=> [A [AD /finite_setP[n An]]|A]; first by exists n.
by move=> [n _ [AD An]]; split=> //; apply/finite_setP; exists n.
Qed.
\bigcup_n [set A | A `<=` D /\ A #= `I_n ].
by apply: bigcup_countable => // ? _; exact: countable_n_subset.
rewrite eqEsubset; split=> [A [AD /finite_setP[n An]]|A]; first by exists n.
by move=> [n _ [AD An]]; split=> //; apply/finite_setP; exists n.
Qed.
Lemma eq_card_fset_subset {T : pointedType} (D : set T) :
[set A | A `<=` D /\ finite_set A ] #= [set A : {fset T} | {subset A <= D}] .
Proof.
apply/card_set_bijP; exists (@fset_set T); split.
- by move=> A [AD fsetA] /= x; rewrite in_fset_set // ?inE; exact: AD.
- by move=> ? ? /set_mem [_ +] /set_mem [_ +]; exact: fset_set_inj.
- move=> B /= BD; exists [set` B]; rewrite ?set_fsetK //.
by split; [by move => x /= /BD /set_mem | exact: finite_fset].
Qed.
- by move=> A [AD fsetA] /= x; rewrite in_fset_set // ?inE; exact: AD.
- by move=> ? ? /set_mem [_ +] /set_mem [_ +]; exact: fset_set_inj.
- move=> B /= BD; exists [set` B]; rewrite ?set_fsetK //.
by split; [by move => x /= /BD /set_mem | exact: finite_fset].
Qed.
Lemma fset_subset_countable {T : pointedType} (D : set T) :
countable D -> countable [set A : {fset T} | {subset A <= D}].
Proof.
HB.mixin Record FiniteImage aT rT (f : aT -> rT) := {
fimfunP : finite_set (range f)
}.
HB.structure Definition FImFun aT rT := {f of @FiniteImage aT rT f}.
Arguments fimfunP {aT rT} _.
#[global] Hint Extern 0 (finite_set _) => solve [apply: fimfunP] : core.
Reserved Notation "{ 'fimfun' aT >-> T }"
(at level 0, format "{ 'fimfun' aT >-> T }").
Reserved Notation "[ 'fimfun' 'of' f ]"
(at level 0, format "[ 'fimfun' 'of' f ]").
Notation "{ 'fimfun' aT >-> T }" := (@FImFun.type aT T) : form_scope.
Notation "[ 'fimfun' 'of' f ]" := [the {fimfun _ >-> _} of f] : form_scope.
Lemma fimfun_inP {aT rT} (f : {fimfun aT >-> rT}) (D : set aT) :
finite_set (f @` D).
Proof.
#[global] Hint Resolve fimfun_inP : core.
Lemma fset_set_comp (T1 : Type) (T2 T3 : choiceType) (D : set T1)
(f : {fimfun T1 >-> T2}) (g : T2 -> T3) :
fset_set [set (g \o f) x | x in D] =
[fset g x | x in fset_set [set f x | x in D]]%fset.
Proof.
Section fimfun_pred.
Context {aT rT : Type}.
Definition fimfun : {pred aT -> rT} := mem [set f | finite_set (range f)].
Definition fimfun_key : pred_key fimfun.
Proof.
exact. Qed.
End fimfun_pred.
Section fimfun.
Context {aT rT : Type}.
Notation T := {fimfun aT >-> rT}.
Notation fimfun := (@fimfun aT rT).
Section Sub.
Context (f : aT -> rT) (fP : f \in fimfun).
Definition fimfun_Sub_subproof := @FiniteImage.Build aT rT f (set_mem fP).
#[local] HB.instance Definition _ := fimfun_Sub_subproof.
Definition fimfun_Sub := [fimfun of f].
End Sub.
Lemma fimfun_rect (K : T -> Type) :
(forall f (Pf : f \in fimfun), K (fimfun_Sub Pf)) -> forall u : T, K u.
Proof.
Lemma fimfun_valP f (Pf : f \in fimfun) : fimfun_Sub Pf = f :> (_ -> _).
Proof.
by []. Qed.
HB.instance Definition _ := isSub.Build _ _ T fimfun_rect fimfun_valP.
End fimfun.
Lemma fimfuneqP aT rT (f g : {fimfun aT >-> rT}) :
f = g <-> f =1 g.
HB.instance Definition _ aT (rT : eqType) :=
[Equality of {fimfun aT >-> rT} by <:].
HB.instance Definition _ aT (rT : choiceType) :=
[Choice of {fimfun aT >-> rT} by <:].
Lemma finite_image_cst {aT rT : Type} (x : rT) :
finite_set (range (cst x : aT -> _)).
Proof.
Lemma cst_fimfun_subproof aT rT x : @FiniteImage aT rT (cst x).
Proof.
Definition cst_fimfun {aT rT} x := [the {fimfun aT >-> rT} of cst x].
Lemma fimfun_cst aT rT x : @cst_fimfun aT rT x =1 cst x. Proof. by [].
Lemma comp_fimfun_subproof aT rT sT
(f : {fimfun aT >-> rT}) (g : rT -> sT) : @FiniteImage aT sT (g \o f).
Proof.
Section zmod.
Context (aT : Type) (rT : zmodType).
Lemma fimfun_zmod_closed : zmod_closed (@fimfun aT rT).
Proof.
split=> [|f g]; rewrite !inE/=; first exact: finite_image_cst.
by move=> fA gA; apply: (finite_image11 (fun x y => x - y)).
Qed.
by move=> fA gA; apply: (finite_image11 (fun x y => x - y)).
Qed.
GRing.isZmodClosed.Build (aT -> rT) fimfun fimfun_zmod_closed.
HB.instance Definition _ :=
[SubChoice_isSubZmodule of {fimfun aT >-> rT} by <:].
Implicit Types (f g : {fimfun aT >-> rT}).
Lemma fimfunD f g : f + g = f \+ g :> (_ -> _)
Proof.
by []. Qed.
Proof.
by []. Qed.
Proof.
by []. Qed.
Proof.
by []. Qed.
(\sum_(i <- r | P i) f i) x = \sum_(i <- r | P i) f i x.
Proof.
HB.instance Definition _ f g := FImFun.copy (f \+ g) (f + g).
HB.instance Definition _ f g := FImFun.copy (\- f) (- f).
HB.instance Definition _ f g := FImFun.copy (f \- g) (f - g).
End zmod.