X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Fcontribs%2Fdama%2Fdama%2Fproperty_sigma.ma;h=67209928116df8aec54e7a70e5304a0011d257e1;hb=ada8695ba51b2ecbd4a955f990e8d06f038aac6b;hp=757c18a07d83e37dda2a908a3036d3e7725c69de;hpb=5070f476ff80ee53fe444d284f9e7587a37022f4;p=helm.git

diff --git a/helm/software/matita/contribs/dama/dama/property_sigma.ma b/helm/software/matita/contribs/dama/dama/property_sigma.ma
index 757c18a07..672099281 100644
--- a/helm/software/matita/contribs/dama/dama/property_sigma.ma
+++ b/helm/software/matita/contribs/dama/dama/property_sigma.ma
@@ -13,7 +13,7 @@
 (**************************************************************************)
 
 include "ordered_uniform.ma".
-
+include "russell_support.ma".
 
 (* Definition 3.5 *)
 alias num (instance 0) = "natural number".
@@ -57,51 +57,40 @@ qed.
 lemma max_le_r: ∀n,m,z.max n m ≤ z → m ≤ z.
 intros; rewrite > sym_max in H; apply (max_le_l ??? H); 
 qed.
-
-definition hide ≝ λT:Type.λx:T.x.
-
-notation < "\blacksquare" non associative with precedence 50 for @{'hide}.
-interpretation "hide" 'hide = (hide _ _).
-interpretation "hide2" 'hide = (hide _ _ _).
-
-definition inject ≝ λP.λa:nat.λp:P a. ex_introT ? P ? p.
-coercion cic:/matita/dama/property_sigma/inject.con 0 1.
-definition eject ≝ λP.λc: ∃n:nat.P n. match c with [ ex_introT w _ ⇒ w].
-coercion cic:/matita/dama/property_sigma/eject.con.
-      
+    
 (* Lemma 3.6 *)   
 lemma sigma_cauchy:
   ∀C:ordered_uniform_space.property_sigma C →
     ∀a:sequence C.∀l:C.(a ↑ l ∨ a ↓ l) → a is_cauchy → a uniform_converges l.
 intros 8; cases (H ? H3) (w H5); cases H5 (H8 H9); clear H5;
+alias symbol "pair" = "pair".
+letin spec ≝ (λz,k:nat.∀i,j,l:nat.k ≤ i → k ≤ j → l ≤ z → w l 〈a i,a j〉);
 letin m ≝ (hide ? (let rec aux (i:nat) : nat ≝
   match i with
   [ O ⇒ match H2 (w i) ? with [ ex_introT k _ ⇒ k ]
   | S i' ⇒ max (match H2 (w i) ? with [ ex_introT k _ ⇒ k ]) (S (aux i'))
   ] in aux
-  : 
-  ∀z:nat.∃k:nat.∀i,j,l.k ≤ i → k ≤ j → l ≤ z → w l 〈a i, a j〉));
+  : ∀z.∃k. spec z k)); unfold spec in aux ⊢ %;
   [1,2:apply H8;
   |3: intros 3; cases (H2 (w n) (H8 n)); simplify in ⊢ (? (? % ?) ?→?);
       simplify in ⊢ (?→? (? % ?) ?→?);
       intros; lapply (H5 i j) as H14;
         [2: apply (max_le_l ??? H6);|3:apply (max_le_l ??? H7);]
       cases (le_to_or_lt_eq ?? H10); [2: destruct H11; destruct H4; assumption]
-      generalize in match H6; generalize in match H7;
-      cases (aux n1); simplify in ⊢ (? (? ? %) ?→? (? ? %) ?→?); intros;
-      apply H12; [3: apply le_S_S_to_le; assumption]
+      cases (aux n1) in H6 H7 ⊢ %; simplify in ⊢ (? (? ? %) ?→? (? ? %) ?→?); intros;
+      apply H6; [3: apply le_S_S_to_le; assumption]
       apply lt_to_le; apply (max_le_r w1); assumption;
   |4: intros; clear H6; rewrite > H4 in H5; 
       rewrite < (le_n_O_to_eq ? H11); apply H5; assumption;] 
-cut (((m : nat→nat) : sequence nat_ordered_set) is_strictly_increasing) as Hm; [2:
+cut ((⌊x,(m x:nat)⌋ : sequence nat_ordered_set) is_strictly_increasing) as Hm; [2:
   intro n; change with (S (m n) ≤ m (S n)); unfold m; 
   whd in ⊢ (? ? %); apply (le_max ? (S (m n)));]
-cut (((m : nat→nat) : sequence nat_ordered_set) is_increasing) as Hm1; [2:
+cut ((⌊x,(m x:nat)⌋ : sequence nat_ordered_set) is_increasing) as Hm1; [2:
   intro n; intro L; change in L with (m (S n) < m n);
   lapply (Hm n) as L1; change in L1 with (m n < m (S n));
   lapply (trans_lt ??? L L1) as L3; apply (not_le_Sn_n ? L3);] 
-clearbody m;
-cut ((λx:nat.a (m x))↑ l ∨ (λx:nat.a (m x)) ↓ l) as H10; [2: 
+clearbody m; unfold spec in m Hm Hm1; clear spec;
+cut (⌊x,a (m x)⌋ ↑ l ∨ ⌊x,a (m x)⌋ ↓ l) as H10; [2: 
  cases H1;
  [ left; apply (selection_uparrow ?? Hm a l H4);
  | right; apply (selection_downarrow ?? Hm a l H4);]]