X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Flibrary%2Fdemo%2Fformal_topology.ma;h=56a8c4120b802e3b65dc73f14417820c22d58855;hb=13f687d1d7cc07a19dcf28e1624f78a3a9d9c840;hp=05711b7b6ca840cb95ceff01f941b52709e815d9;hpb=4d765cc85e3a1e84c80c348a1e67ea1eed984916;p=helm.git

diff --git a/helm/software/matita/library/demo/formal_topology.ma b/helm/software/matita/library/demo/formal_topology.ma
index 05711b7b6..56a8c4120 100644
--- a/helm/software/matita/library/demo/formal_topology.ma
+++ b/helm/software/matita/library/demo/formal_topology.ma
@@ -13,90 +13,85 @@
 (**************************************************************************)
 
 include "logic/equality.ma".
+include "logic/cprop_connectives.ma".
 
-inductive And (A,B:CProp) : CProp ≝
- conj: A → B → And A B.
- 
-interpretation "constructive and" 'and x y = (And x y).
+record powerset (A : Type) : Type ≝ { char : A → CProp }.
 
-inductive exT (A:Type) (P:A→CProp) : CProp ≝
-  ex_introT: ∀w:A. P w → exT A P.
+interpretation "char" 'subset p = (mk_powerset _ p).  
 
-interpretation "CProp exists" 'exists \eta.x = (exT _ x).
+interpretation "pwset" 'powerset a = (powerset a). 
 
-record powerset (A: Type) : Type ≝ { char: A → CProp }.
+interpretation "in" 'mem a X = (char _ X a). 
 
-notation "hvbox(2 \sup A)" non associative with precedence 45
-for @{ 'powerset $A }.
+definition subseteq ≝ λA.λu,v:\Omega \sup A.∀x.x ∈ u → x ∈ v.
 
-interpretation "powerset" 'powerset A = (powerset A).
+interpretation "subseteq" 'subseteq u v = (subseteq _ u v).
 
-definition mem ≝ λA.λS:2 \sup A.λx:A. match S with [mk_powerset c ⇒ c x].
+definition overlaps ≝ λA.λU,V : Ω \sup A. exT2 ? (λx.x ∈ U) (λx.x ∈ V).
 
-notation "hvbox(a break ∈ b)" non associative with precedence 45
-for @{ 'mem $a $b }.
+interpretation "overlaps" 'overlaps u v = (overlaps _ u v).
 
-interpretation "mem" 'mem a S = (mem _ S a).
+definition intersect ≝ λA.λu,v:Ω\sup A.{ y | y ∈ u ∧ y ∈ v }.
 
-record axiom_set : Type ≝
- { A:> Type;
-   i: A → Type;
-   C: ∀a:A. i a → 2 \sup A
- }.
+interpretation "intersect" 'intersects u v = (intersect _ u v). 
+
+record axiom_set : Type ≝ { 
+  A:> Type;
+  i: A → Type;
+  C: ∀a:A. i a → Ω \sup A
+}.
 
-inductive iter (A: axiom_set) (U,V: 2 \sup A) (covers: A → CProp) : CProp ≝
-   cycle: (∀a:A.a ∈ V → covers a) → iter A U V covers.
+inductive for_all (A: axiom_set) (U,V: Ω \sup A) (covers: A → CProp) : CProp ≝
+   iter: (∀a:A.a ∈ V → covers a) → for_all A U V covers.
 
-inductive covers (A: axiom_set) (U: 2 \sup A) : A → CProp ≝
+inductive covers (A: axiom_set) (U: \Omega \sup A) : A → CProp ≝
    refl: ∀a:A. a ∈ U → covers A U a
- | infinity: ∀a:A. ∀j: i ? a. iter A U (C ? a j) (covers A U) → covers A U a.
+ | infinity: ∀a:A. ∀j: i ? a. for_all A U (C ? a j) (covers A U) → covers A U a.
 
 notation "hvbox(a break ◃ b)" non associative with precedence 45
-for @{ 'covers $a $b }.
+for @{ 'covers $a $b }. (* a \ltri b *)
 
-interpretation "coversl" 'covers A U = (iter _ U A (covers _ U)).
+interpretation "coversl" 'covers A U = (for_all _ U A (covers _ U)).
 interpretation "covers" 'covers a U = (covers _ U a).
 
 definition covers_elim ≝
- λA:axiom_set.λU: 2 \sup A.λP:2 \sup A.
-  λH1:∀a:A. a ∈ U → a ∈ P.
-   λH2:∀a:A.∀j:i ? a. C ? a j ◃ U → (∀b. b ∈ C ? a j → b ∈ P) → a ∈ P.
+ λA:axiom_set.λU: \Omega \sup A.λP:\Omega \sup A.
+  λH1: U ⊆ P. 
+   λH2:∀a:A.∀j:i ? a. C ? a j ◃ U → C ? a j ⊆ P → a ∈ P.
     let rec aux (a:A) (p:a ◃ U) on p : a ∈ P ≝
      match p return λaa.λ_:aa ◃ U.aa ∈ P with
       [ refl a q ⇒ H1 a q
       | infinity a j q ⇒
          H2 a j q
-          match q return λ_:(C ? a j) ◃ U.∀b. b ∈ (C ? a j) → b ∈ P with
-          [ cycle f ⇒ λb.λr. aux b (f b r) ]]
+          match q return λ_:(C ? a j) ◃ U. C ? a j ⊆ P with
+          [ iter f ⇒ λb.λr. aux b (f b r) ]]
     in
      aux.
 
-coinductive fish (A:axiom_set) (U: 2 \sup A) : A → CProp ≝
- mk_fish: ∀a:A. (a ∈ U ∧ ∀j: i ? a. ∃y: A. y ∈ C ? a j ∧ fish A U y) → fish A U a.
-definition fishl ≝ λA:axiom_set.λU:2 \sup A.λV:2 \sup A. ∃a. a ∈ V ∧ fish ? U a.
+inductive ex_such (A : axiom_set) (U,V : \Omega \sup A) (fish: A → CProp) : CProp ≝
+ found : ∀a. a ∈ V → fish a → ex_such A U V fish.
+
+coinductive fish (A:axiom_set) (U: \Omega \sup A) : A → CProp ≝
+ mk_fish: ∀a:A. a ∈ U → (∀j: i ? a. ex_such A U (C ? a j) (fish A U)) → fish A U a.
 
 notation "hvbox(a break ⋉ b)" non associative with precedence 45
-for @{ 'fish $a $b }.
+for @{ 'fish $a $b }. (* a \ltimes b *)
 
-interpretation "fishl" 'fish A U = (fishl _ U A).
+interpretation "fishl" 'fish A U = (ex_such _ U A (fish _ U)).
 interpretation "fish" 'fish a U = (fish _ U a).
 
-let corec fish_rec (A:axiom_set) (U: 2 \sup A)
- (P: 2 \sup A) (H1: ∀a:A. a ∈ P → a ∈ U)
-  (H2: ∀a:A. a ∈ P → ∀j: i ? a. ∃y: A. y ∈ C ? a j ∧ y ∈ P) :
+let corec fish_rec (A:axiom_set) (U: \Omega \sup A)
+ (P: Ω \sup A) (H1: P ⊆ U)
+  (H2: ∀a:A. a ∈ P → ∀j: i ? a. C ? a j ≬ P):
    ∀a:A. ∀p: a ∈ P. a ⋉ U ≝
  λa,p.
   mk_fish A U a
-   (conj ? ? (H1 ? p)
+   (H1 ? p)
    (λj: i ? a.
     match H2 a p j with
-     [ ex_introT (y: A) (Ha: y ∈ C ? a j ∧ y ∈ P) ⇒
-        match Ha with
-         [ conj (fHa: y ∈ C ? a j) (sHa: y ∈ P) ⇒
-            ex_introT A (λy.y ∈ C ? a j ∧ fish A U y) y
-             (conj ? ? fHa (fish_rec A U P H1 H2 y sHa))
-         ]
-     ])).
+     [ ex_introT2 (y: A) (HyC : y ∈ C ? a j) (HyP : y ∈ P) ⇒
+         found ???? y HyC (fish_rec A U P H1 H2 y HyP)
+     ]).
 
 theorem reflexivity: ∀A:axiom_set.∀a:A.∀V. a ∈ V → a ◃ V.
  intros;
@@ -106,56 +101,58 @@ qed.
 
 theorem transitivity: ∀A:axiom_set.∀a:A.∀U,V. a ◃ U → U ◃ V → a ◃ V.
  intros;
- apply (covers_elim ?? (mk_powerset A (λa.a ◃ V)) ??? H); simplify; intros;
-  [ cases H1 in H2;
-    intro;
-    apply H2;
-    assumption
+ apply (covers_elim ?? {a | a ◃ V} ??? H); simplify; intros;
+  [ cases H1 in H2; apply H2;
   | apply infinity;
      [ assumption
      | constructor 1;
        assumption]]
 qed.
 
+theorem covers_elim2:
+ ∀A: axiom_set. ∀U:Ω \sup A.∀P: A → CProp.
+  (∀a:A. a ∈ U → P a) →
+   (∀a:A.∀V:Ω \sup A. a ◃ V → V ◃ U → (∀y. y ∈ V → P y) → P a) →
+     ∀a:A. a ◃ U → P a.
+ intros;
+ change with (a ∈ {a | P a});
+ apply (covers_elim ?????? H2);
+  [ intros 2; simplify; apply H; assumption
+  | intros;
+    simplify in H4 ⊢ %;
+    apply H1;
+     [ apply (C ? a1 j);
+     | autobatch;
+     | assumption;
+     | assumption]]
+qed.
+
 theorem coreflexivity: ∀A:axiom_set.∀a:A.∀V. a ⋉ V → a ∈ V.
  intros;
  cases H;
- cases H1;
  assumption.
 qed.
 
 theorem cotransitivity:
  ∀A:axiom_set.∀a:A.∀U,V. a ⋉ U → (∀b:A. b ⋉ U → b ∈ V) → a ⋉ V.
  intros;
- apply (fish_rec ?? (mk_powerset A (λa.a ⋉ U)) ??? H); simplify; intros;
-  [ apply H1;
-    assumption
-  | cases H2 in j; clear H2; cases H3; clear H3;
-    assumption]
+ apply (fish_rec ?? {a|a ⋉ U} ??? H); simplify; intros;
+  [ apply H1; apply H2;
+  | cases H2 in j; clear H2; intro i;
+    cases (H4 i); clear H4; exists[apply a3] assumption]
 qed.
 
 theorem compatibility: ∀A:axiom_set.∀a:A.∀U,V. a ⋉ V → a ◃ U → U ⋉ V.
  intros;
  generalize in match H; clear H; 
- apply (covers_elim ?? (mk_powerset A (λa.a ⋉ V → U ⋉ V)) ??? H1);
+ apply (covers_elim ?? {a|a ⋉ V → U ⋉ V} ??? H1);
  clear H1; simplify; intros;
-  [ exists [apply a1]
-    split;
-    assumption
-  | cases H2 in j H H1; clear H2 a1; intros;
-    cases H; clear H;
-    cases (H4 i); clear H4; cases H; clear H;
-    apply (H2 w); clear H2;
-    assumption]
+  [ exists [apply x] assumption
+  | cases H2 in j H H1; clear H2 a1; intros; 
+    cases (H1 i); clear H1; apply (H3 a1); assumption]
 qed.
 
-definition singleton ≝ λA:axiom_set.λa:A.mk_powerset ? (λb:A.a=b).
-
-notation "hvbox({ term 19 a })" with precedence 90 for @{ 'singl $a}.
-
-interpretation "singleton" 'singl a = (singleton _ a).
-
-definition leq ≝ λA:axiom_set.λa,b:A. a ◃ {b}.
+definition leq ≝ λA:axiom_set.λa,b:A. a ◃ {y|b=y}.
 
 interpretation "covered by one" 'leq a b = (leq _ a b).
 
@@ -179,38 +176,17 @@ qed.
 
 definition uparrow ≝ λA:axiom_set.λa:A.mk_powerset ? (λb:A. a ≤ b).
 
-notation "↑a" with precedence 80 for @{ 'uparrow $a }.
-
 interpretation "uparrow" 'uparrow a = (uparrow _ a).
 
-definition overlaps ≝ λA:Type.λU,V:2 \sup A.∃a:A. a ∈ U ∧ a ∈ V.
-
-notation "hvbox(a break ≬ b)" non associative with precedence 45
-for @{ 'overlaps $a $b }.
-
-interpretation "overlaps" 'overlaps U V = (overlaps _ U V).
-
-definition intersects ≝ λA:Type.λU,V:2 \sup A.mk_powerset ? (λa:A. a ∈ U ∧ a ∈ V).
-
-notation "hvbox(a break ∩ b)" non associative with precedence 55
-for @{ 'intersects $a $b }.
-
-interpretation "intersects" 'intersects U V = (intersects _ U V).
-
-definition downarrow ≝ λA:axiom_set.λU:2 \sup A.mk_powerset ? (λa:A. ↑a ≬ U).
-
-notation "↓a" with precedence 80 for @{ 'downarrow $a }.
+definition downarrow ≝ λA:axiom_set.λU:Ω \sup A.mk_powerset ? (λa:A. (↑a) ≬ U).
 
 interpretation "downarrow" 'downarrow a = (downarrow _ a).
 
-definition fintersects ≝ λA:axiom_set.λU,V:2 \sup A.↓U ∩ ↓V.
-
-notation "hvbox(U break ↓ V)" non associative with precedence 80 for @{ 'fintersects $U $V }.
+definition fintersects ≝ λA:axiom_set.λU,V:Ω \sup A.↓U ∩ ↓V.
 
 interpretation "fintersects" 'fintersects U V = (fintersects _ U V).
 
 record convergent_generated_topology : Type ≝
  { AA:> axiom_set;
-   convergence: ∀a:AA.∀U,V:2 \sup AA. a ◃ U → a ◃ V → a ◃ U ↓ V
+   convergence: ∀a:AA.∀U,V:Ω \sup AA. a ◃ U → a ◃ V → a ◃ (U ↓ V)
  }.
-