X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Fcontribs%2FLOGIC%2FTrack%2Finv.ma;h=51935b4e003accf4c4ef5f964849c61ae6d016ac;hb=HEAD;hp=347d7fccb78d9b2faf2d009fd4fb1c41486773f0;hpb=b8254eac73531e90312e3a40dc12ae51b18c5c92;p=helm.git

diff --git a/helm/software/matita/contribs/LOGIC/Track/inv.ma b/helm/software/matita/contribs/LOGIC/Track/inv.ma
index 347d7fccb..51935b4e0 100644
--- a/helm/software/matita/contribs/LOGIC/Track/inv.ma
+++ b/helm/software/matita/contribs/LOGIC/Track/inv.ma
@@ -12,54 +12,49 @@
 (*                                                                        *)
 (**************************************************************************)
 
-set "baseuri" "cic:/matita/LOGIC/Track/inv".
+
 
 include "Track/defs.ma".
 
+(* Main inversion lemmas ****************************************************)
+
 theorem track_inv_lref: \forall Q,S,i. Track Q (lref i) S \to
-                        \exists P. Insert S i P Q.
- intros; inversion H; clear H; intros; subst; autobatch.
+                        \exists p1,p2,P. Insert p1 p2 S i P Q.
+ intros; inversion H; clear H; intros; destruct; autobatch depth = 4.
 qed.
 
-theorem track_inv_parx: \forall P,S,h. Track P (parx h) S \to
+theorem track_inv_prin: \forall P,S,h. Track P (prin h) S \to
                         S = pair (posr h) (posr h).
- intros; inversion H; clear H; intros; subst; autobatch.
+ intros; inversion H; clear H; intros; destruct; autobatch.
 qed.
 
 theorem track_inv_impw: \forall P,p,S. Track P (impw p) S \to
                         \exists B,a,b. 
                         S = pair (impl a b) B \land 
                         Track P p (pair lleaf B).
- intros; inversion H; clear H; intros; subst; autobatch depth = 5.
+ intros; inversion H; clear H; intros; destruct; autobatch depth = 5.
 qed.
 
-theorem track_inv_impr: \forall P,p,S. Track P (impr p) S \to
+theorem track_inv_impr: \forall Q,p,S. Track Q (impr p) S \to
                         \exists a,b:Formula. 
                         S = pair lleaf (impl a b) \land
-                        Track P p (pair a b).
- intros; inversion H; clear H; intros; subst; autobatch depth = 4.
+                        Track Q p (pair a b).
+ intros; inversion H; clear H; intros; destruct; autobatch depth = 4.
 qed.
 
 theorem track_inv_impi: \forall P,p,q,r,S. Track P (impi p q r) S \to
-                        \exists Q,A,B,D,i. \exists a,b:Formula.
+                        \exists A,B,D. \exists a,b:Formula.
                         S = pair (impl a b) D \land
                         Track P p (pair A a) \land
                         Track P q (pair b B) \land
-                        Track Q r (pair lleaf D) \land
-                        Insert (pair A B) i P Q.
- intros; inversion H; clear H; intros; subst; autobatch depth = 12 width = 5 size = 16.
-qed.
-
-theorem track_inv_scut: \forall P,q,r,S. Track P (scut q r) S \to False.
- intros; inversion H; clear H; intros; subst.
+                        Track (abst P p q (pair A B)) r (pair lleaf D).
+ intros; inversion H; clear H; intros; destruct; autobatch depth = 9 width = 4 size = 12.
 qed.
 
-theorem track_inv_lleaf_impl: 
-   \forall Q,p,a,b. Track Q p (pair lleaf (impl a b)) \to
-   (\exists P,i. p = lref i \land Insert (pair lleaf (impl a b)) i P Q) \lor
-   (\exists r. p = impr r \land Track Q r (pair a b)).
- intros; inversion H; clear H; intros; subst;
- [ autobatch depth = 5
- | subst; autobatch depth = 4
- ].
+theorem track_inv_scut: \forall P,q,r,S. Track P (scut q r) S \to
+                        \exists A,B. \exists c:Formula.
+                        S = pair A B \land
+                        Track P q (pair A c) \land
+                        Track P r (pair c B).
+ intros; inversion H; clear H; intros; destruct; autobatch depth = 6 size = 8. 
 qed.