(**************************************************************************)
(* ********************************************************************** *)
-(* Progetto FreeScale *)
+(* Progetto FreeScale *)
(* *)
-(* Sviluppato da: *)
-(* Cosimo Oliboni, oliboni@cs.unibo.it *)
+(* Sviluppato da: Cosimo Oliboni, oliboni@cs.unibo.it *)
+(* Cosimo Oliboni, oliboni@cs.unibo.it *)
(* *)
-(* Questo materiale fa parte della tesi: *)
-(* "Formalizzazione Interattiva dei Microcontroller a 8bit FreeScale" *)
-(* *)
-(* data ultima modifica 15/11/2007 *)
(* ********************************************************************** *)
include "freescale/bool_lemmas.ma".
nchange with (match pair T1 T2 x2 y2 with [ pair a _ ⇒ x1 = a ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma pair_destruct_2 :
nchange with (match pair T1 T2 x2 y2 with [ pair _ b ⇒ y1 = b ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
-nlemma bsymmetric_eqpair :
+nlemma symmetric_eqpair :
∀T1,T2:Type.∀p1,p2:ProdT T1 T2.
∀f1:T1 → T1 → bool.∀f2:T2 → T2 → bool.
(symmetricT T1 bool f1) →
(symmetricT T2 bool f2) →
(eq_pair T1 T2 p1 p2 f1 f2 = eq_pair T1 T2 p2 p1 f1 f2).
#T1; #T2; #p1; #p2; #f1; #f2; #H; #H1;
- napply (ProdT_ind T1 T2 ?? p1);
+ nelim p1;
#x1; #y1;
- napply (ProdT_ind T1 T2 ?? p2);
+ nelim p2;
#x2; #y2;
nnormalize;
nrewrite > (H x1 x2);
ncases (f1 x2 x1);
nnormalize;
- ##[ ##1: nrewrite > (H1 y1 y2); napply (refl_eq ??)
- ##| ##2: napply (refl_eq ??)
+ ##[ ##1: nrewrite > (H1 y1 y2); napply refl_eq
+ ##| ##2: napply refl_eq
##]
nqed.
(∀y1,y2:T2.y1 = y2 → f2 y1 y2 = true) →
(p1 = p2 → eq_pair T1 T2 p1 p2 f1 f2 = true).
#T1; #T2; #p1; #p2; #f1; #f2; #H1; #H2;
- napply (ProdT_ind T1 T2 ?? p1);
+ nelim p1;
#x1; #y1;
- napply (ProdT_ind T1 T2 ?? p2);
+ nelim p2;
#x2; #y2; #H;
nnormalize;
- nrewrite > (H1 ?? (pair_destruct_1 ?????? H));
+ nrewrite > (H1 … (pair_destruct_1 … H));
nnormalize;
- nrewrite > (H2 ?? (pair_destruct_2 ?????? H));
- napply (refl_eq ??).
+ nrewrite > (H2 … (pair_destruct_2 … H));
+ napply refl_eq.
nqed.
nlemma eqpair_to_eq :
(∀y1,y2:T2.f2 y1 y2 = true → y1 = y2) →
(eq_pair T1 T2 p1 p2 f1 f2 = true → p1 = p2).
#T1; #T2; #p1; #p2; #f1; #f2; #H1; #H2;
- napply (ProdT_ind T1 T2 ?? p1);
+ nelim p1;
#x1; #y1;
- napply (ProdT_ind T1 T2 ?? p2);
+ nelim p2;
#x2; #y2; #H;
nnormalize in H:(%);
nletin K ≝ (H1 x1 x2);
ncases (f1 x1 x2) in H:(%) K:(%);
nnormalize;
#H3;
- ##[ ##2: napply (bool_destruct ??? H3) ##]
+ ##[ ##2: napply (bool_destruct … H3) ##]
#H4;
- nrewrite > (H4 (refl_eq ??));
+ nrewrite > (H4 (refl_eq …));
nrewrite > (H2 y1 y2 H3);
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma triple_destruct_1 :
nchange with (match triple T1 T2 T3 x2 y2 z2 with [ triple a _ _ ⇒ x1 = a ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma triple_destruct_2 :
nchange with (match triple T1 T2 T3 x2 y2 z2 with [ triple _ b _ ⇒ y1 = b ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma triple_destruct_3 :
nchange with (match triple T1 T2 T3 x2 y2 z2 with [ triple _ _ c ⇒ z1 = c ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
-nlemma bsymmetric_eqtriple :
+nlemma symmetric_eqtriple :
∀T1,T2,T3:Type.∀p1,p2:Prod3T T1 T2 T3.
∀f1:T1 → T1 → bool.∀f2:T2 → T2 → bool.∀f3:T3 → T3 → bool.
(symmetricT T1 bool f1) →
(symmetricT T3 bool f3) →
(eq_triple T1 T2 T3 p1 p2 f1 f2 f3 = eq_triple T1 T2 T3 p2 p1 f1 f2 f3).
#T1; #T2; #T3; #p1; #p2; #f1; #f2; #f3; #H; #H1; #H2;
- napply (Prod3T_ind T1 T2 T3 ?? p1);
+ nelim p1;
#x1; #y1; #z1;
- napply (Prod3T_ind T1 T2 T3 ?? p2);
+ nelim p2;
#x2; #y2; #z2;
nnormalize;
nrewrite > (H x1 x2);
##[ ##1: nrewrite > (H1 y1 y2);
ncases (f2 y2 y1);
nnormalize;
- ##[ ##1: nrewrite > (H2 z1 z2); napply (refl_eq ??)
- ##| ##2: napply (refl_eq ??)
+ ##[ ##1: nrewrite > (H2 z1 z2); napply refl_eq
+ ##| ##2: napply refl_eq
##]
- ##| ##2: napply (refl_eq ??)
+ ##| ##2: napply refl_eq
##]
nqed.
(∀z1,z2:T3.z1 = z2 → f3 z1 z2 = true) →
(p1 = p2 → eq_triple T1 T2 T3 p1 p2 f1 f2 f3 = true).
#T1; #T2; #T3; #p1; #p2; #f1; #f2; #f3; #H1; #H2; #H3;
- napply (Prod3T_ind T1 T2 T3 ?? p1);
+ nelim p1;
#x1; #y1; #z1;
- napply (Prod3T_ind T1 T2 T3 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #H;
nnormalize;
- nrewrite > (H1 ?? (triple_destruct_1 ????????? H));
+ nrewrite > (H1 … (triple_destruct_1 … H));
nnormalize;
- nrewrite > (H2 ?? (triple_destruct_2 ????????? H));
+ nrewrite > (H2 … (triple_destruct_2 … H));
nnormalize;
- nrewrite > (H3 ?? (triple_destruct_3 ????????? H));
- napply (refl_eq ??).
+ nrewrite > (H3 … (triple_destruct_3 … H));
+ napply refl_eq.
nqed.
nlemma eqtriple_to_eq :
(∀z1,z2:T3.f3 z1 z2 = true → z1 = z2) →
(eq_triple T1 T2 T3 p1 p2 f1 f2 f3 = true → p1 = p2).
#T1; #T2; #T3; #p1; #p2; #f1; #f2; #f3; #H1; #H2; #H3;
- napply (Prod3T_ind T1 T2 T3 ?? p1);
+ nelim p1;
#x1; #y1; #z1;
- napply (Prod3T_ind T1 T2 T3 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #H;
nnormalize in H:(%);
nletin K ≝ (H1 x1 x2);
ncases (f1 x1 x2) in H:(%) K:(%);
nnormalize;
- ##[ ##2: #H4; napply (bool_destruct ??? H4) ##]
+ ##[ ##2: #H4; napply (bool_destruct … H4) ##]
nletin K1 ≝ (H2 y1 y2);
ncases (f2 y1 y2) in K1:(%) ⊢ %;
nnormalize;
- ##[ ##2: #H4; #H5; napply (bool_destruct ??? H5) ##]
+ ##[ ##2: #H4; #H5; napply (bool_destruct … H5) ##]
#H4; #H5; #H6;
- nrewrite > (H4 (refl_eq ??));
- nrewrite > (H6 (refl_eq ??));
+ nrewrite > (H4 (refl_eq …));
+ nrewrite > (H6 (refl_eq …));
nrewrite > (H3 z1 z2 H5);
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quadruple_destruct_1 :
nchange with (match quadruple T1 T2 T3 T4 x2 y2 z2 v2 with [ quadruple a _ _ _ ⇒ x1 = a ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quadruple_destruct_2 :
nchange with (match quadruple T1 T2 T3 T4 x2 y2 z2 v2 with [ quadruple _ b _ _ ⇒ y1 = b ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quadruple_destruct_3 :
nchange with (match quadruple T1 T2 T3 T4 x2 y2 z2 v2 with [ quadruple _ _ c _ ⇒ z1 = c ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quadruple_destruct_4 :
nchange with (match quadruple T1 T2 T3 T4 x2 y2 z2 v2 with [ quadruple _ _ _ d ⇒ v1 = d ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
-nlemma bsymmetric_eqquadruple :
+nlemma symmetric_eqquadruple :
∀T1,T2,T3,T4:Type.∀p1,p2:Prod4T T1 T2 T3 T4.
∀f1:T1 → T1 → bool.∀f2:T2 → T2 → bool.∀f3:T3 → T3 → bool.∀f4:T4 → T4 → bool.
(symmetricT T1 bool f1) →
(symmetricT T4 bool f4) →
(eq_quadruple T1 T2 T3 T4 p1 p2 f1 f2 f3 f4 = eq_quadruple T1 T2 T3 T4 p2 p1 f1 f2 f3 f4).
#T1; #T2; #T3; #T4; #p1; #p2; #f1; #f2; #f3; #f4; #H; #H1; #H2; #H3;
- napply (Prod4T_ind T1 T2 T3 T4 ?? p1);
+ nelim p1;
#x1; #y1; #z1; #v1;
- napply (Prod4T_ind T1 T2 T3 T4 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #v2;
nnormalize;
nrewrite > (H x1 x2);
##[ ##1: nrewrite > (H2 z1 z2);
ncases (f3 z2 z1);
nnormalize;
- ##[ ##1: nrewrite > (H3 v1 v2); napply (refl_eq ??)
- ##| ##2: napply (refl_eq ??)
+ ##[ ##1: nrewrite > (H3 v1 v2); napply refl_eq
+ ##| ##2: napply refl_eq
##]
- ##| ##2: napply (refl_eq ??)
+ ##| ##2: napply refl_eq
##]
- ##| ##2: napply (refl_eq ??)
+ ##| ##2: napply refl_eq
##]
nqed.
(∀v1,v2:T4.v1 = v2 → f4 v1 v2 = true) →
(p1 = p2 → eq_quadruple T1 T2 T3 T4 p1 p2 f1 f2 f3 f4 = true).
#T1; #T2; #T3; #T4; #p1; #p2; #f1; #f2; #f3; #f4; #H1; #H2; #H3; #H4;
- napply (Prod4T_ind T1 T2 T3 T4 ?? p1);
+ nelim p1;
#x1; #y1; #z1; #v1;
- napply (Prod4T_ind T1 T2 T3 T4 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #v2; #H;
nnormalize;
- nrewrite > (H1 ?? (quadruple_destruct_1 ???????????? H));
+ nrewrite > (H1 … (quadruple_destruct_1 … H));
nnormalize;
- nrewrite > (H2 ?? (quadruple_destruct_2 ???????????? H));
+ nrewrite > (H2 … (quadruple_destruct_2 … H));
nnormalize;
- nrewrite > (H3 ?? (quadruple_destruct_3 ???????????? H));
+ nrewrite > (H3 … (quadruple_destruct_3 … H));
nnormalize;
- nrewrite > (H4 ?? (quadruple_destruct_4 ???????????? H));
- napply (refl_eq ??).
+ nrewrite > (H4 … (quadruple_destruct_4 … H));
+ napply refl_eq.
nqed.
nlemma eqquadruple_to_eq :
(∀v1,v2:T4.f4 v1 v2 = true → v1 = v2) →
(eq_quadruple T1 T2 T3 T4 p1 p2 f1 f2 f3 f4 = true → p1 = p2).
#T1; #T2; #T3; #T4; #p1; #p2; #f1; #f2; #f3; #f4; #H1; #H2; #H3; #H4;
- napply (Prod4T_ind T1 T2 T3 T4 ?? p1);
+ nelim p1;
#x1; #y1; #z1; #v1;
- napply (Prod4T_ind T1 T2 T3 T4 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #v2; #H;
nnormalize in H:(%);
nletin K ≝ (H1 x1 x2);
ncases (f1 x1 x2) in H:(%) K:(%);
nnormalize;
- ##[ ##2: #H5; napply (bool_destruct ??? H5) ##]
+ ##[ ##2: #H5; napply (bool_destruct … H5) ##]
nletin K1 ≝ (H2 y1 y2);
ncases (f2 y1 y2) in K1:(%) ⊢ %;
nnormalize;
- ##[ ##2: #H5; #H6; napply (bool_destruct ??? H6) ##]
+ ##[ ##2: #H5; #H6; napply (bool_destruct … H6) ##]
nletin K2 ≝ (H3 z1 z2);
ncases (f3 z1 z2) in K2:(%) ⊢ %;
nnormalize;
- ##[ ##2: #H5; #H6; #H7; napply (bool_destruct ??? H7) ##]
+ ##[ ##2: #H5; #H6; #H7; napply (bool_destruct … H7) ##]
#H5; #H6; #H7; #H8;
- nrewrite > (H5 (refl_eq ??));
- nrewrite > (H6 (refl_eq ??));
- nrewrite > (H8 (refl_eq ??));
+ nrewrite > (H5 (refl_eq …));
+ nrewrite > (H6 (refl_eq …));
+ nrewrite > (H8 (refl_eq …));
nrewrite > (H4 v1 v2 H7);
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quintuple_destruct_1 :
nchange with (match quintuple T1 T2 T3 T4 T5 x2 y2 z2 v2 w2 with [ quintuple a _ _ _ _ ⇒ x1 = a ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quintuple_destruct_2 :
nchange with (match quintuple T1 T2 T3 T4 T5 x2 y2 z2 v2 w2 with [ quintuple _ b _ _ _ ⇒ y1 = b ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quintuple_destruct_3 :
nchange with (match quintuple T1 T2 T3 T4 T5 x2 y2 z2 v2 w2 with [ quintuple _ _ c _ _ ⇒ z1 = c ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quintuple_destruct_4 :
nchange with (match quintuple T1 T2 T3 T4 T5 x2 y2 z2 v2 w2 with [ quintuple _ _ _ d _ ⇒ v1 = d ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
nlemma quintuple_destruct_5 :
nchange with (match quintuple T1 T2 T3 T4 T5 x2 y2 z2 v2 w2 with [ quintuple _ _ _ _ e ⇒ w1 = e ]);
nrewrite < H;
nnormalize;
- napply (refl_eq ??).
+ napply refl_eq.
nqed.
-nlemma bsymmetric_eqquintuple :
+nlemma symmetric_eqquintuple :
∀T1,T2,T3,T4,T5:Type.∀p1,p2:Prod5T T1 T2 T3 T4 T5.
∀f1:T1 → T1 → bool.∀f2:T2 → T2 → bool.∀f3:T3 → T3 → bool.∀f4:T4 → T4 → bool.∀f5:T5 → T5 → bool.
(symmetricT T1 bool f1) →
(symmetricT T5 bool f5) →
(eq_quintuple T1 T2 T3 T4 T5 p1 p2 f1 f2 f3 f4 f5 = eq_quintuple T1 T2 T3 T4 T5 p2 p1 f1 f2 f3 f4 f5).
#T1; #T2; #T3; #T4; #T5; #p1; #p2; #f1; #f2; #f3; #f4; #f5; #H; #H1; #H2; #H3; #H4;
- napply (Prod5T_ind T1 T2 T3 T4 T5 ?? p1);
+ nelim p1;
#x1; #y1; #z1; #v1; #w1;
- napply (Prod5T_ind T1 T2 T3 T4 T5 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #v2; #w2;
nnormalize;
nrewrite > (H x1 x2);
##[ ##1: nrewrite > (H3 v1 v2);
ncases (f4 v2 v1);
nnormalize;
- ##[ ##1: nrewrite > (H4 w1 w2); napply (refl_eq ??)
- ##| ##2: napply (refl_eq ??)
+ ##[ ##1: nrewrite > (H4 w1 w2); napply refl_eq
+ ##| ##2: napply refl_eq
##]
- ##| ##2: napply (refl_eq ??)
+ ##| ##2: napply refl_eq
##]
- ##| ##2: napply (refl_eq ??)
+ ##| ##2: napply refl_eq
##]
- ##| ##2: napply (refl_eq ??)
+ ##| ##2: napply refl_eq
##]
nqed.
(∀w1,w2:T5.w1 = w2 → f5 w1 w2 = true) →
(p1 = p2 → eq_quintuple T1 T2 T3 T4 T5 p1 p2 f1 f2 f3 f4 f5 = true).
#T1; #T2; #T3; #T4; #T5; #p1; #p2; #f1; #f2; #f3; #f4; #f5; #H1; #H2; #H3; #H4; #H5;
- napply (Prod5T_ind T1 T2 T3 T4 T5 ?? p1);
+ nelim p1;
#x1; #y1; #z1; #v1; #w1;
- napply (Prod5T_ind T1 T2 T3 T4 T5 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #v2; #w2; #H;
nnormalize;
- nrewrite > (H1 ?? (quintuple_destruct_1 ??????????????? H));
+ nrewrite > (H1 … (quintuple_destruct_1 … H));
nnormalize;
- nrewrite > (H2 ?? (quintuple_destruct_2 ??????????????? H));
+ nrewrite > (H2 … (quintuple_destruct_2 … H));
nnormalize;
- nrewrite > (H3 ?? (quintuple_destruct_3 ??????????????? H));
+ nrewrite > (H3 … (quintuple_destruct_3 … H));
nnormalize;
- nrewrite > (H4 ?? (quintuple_destruct_4 ??????????????? H));
+ nrewrite > (H4 … (quintuple_destruct_4 … H));
nnormalize;
- nrewrite > (H5 ?? (quintuple_destruct_5 ??????????????? H));
- napply (refl_eq ??).
+ nrewrite > (H5 … (quintuple_destruct_5 … H));
+ napply refl_eq.
nqed.
nlemma eqquintuple_to_eq :
(∀w1,w2:T5.f5 w1 w2 = true → w1 = w2) →
(eq_quintuple T1 T2 T3 T4 T5 p1 p2 f1 f2 f3 f4 f5 = true → p1 = p2).
#T1; #T2; #T3; #T4; #T5; #p1; #p2; #f1; #f2; #f3; #f4; #f5; #H1; #H2; #H3; #H4; #H5;
- napply (Prod5T_ind T1 T2 T3 T4 T5 ?? p1);
+ nelim p1;
#x1; #y1; #z1; #v1; #w1;
- napply (Prod5T_ind T1 T2 T3 T4 T5 ?? p2);
+ nelim p2;
#x2; #y2; #z2; #v2; #w2; #H;
nnormalize in H:(%);
nletin K ≝ (H1 x1 x2);
ncases (f1 x1 x2) in H:(%) K:(%);
nnormalize;
- ##[ ##2: #H6; napply (bool_destruct ??? H6) ##]
+ ##[ ##2: #H6; napply (bool_destruct … H6) ##]
nletin K1 ≝ (H2 y1 y2);
ncases (f2 y1 y2) in K1:(%) ⊢ %;
nnormalize;
- ##[ ##2: #H6; #H7; napply (bool_destruct ??? H7) ##]
+ ##[ ##2: #H6; #H7; napply (bool_destruct … H7) ##]
nletin K2 ≝ (H3 z1 z2);
ncases (f3 z1 z2) in K2:(%) ⊢ %;
nnormalize;
- ##[ ##2: #H6; #H7; #H8; napply (bool_destruct ??? H8) ##]
+ ##[ ##2: #H6; #H7; #H8; napply (bool_destruct … H8) ##]
nletin K3 ≝ (H4 v1 v2);
ncases (f4 v1 v2) in K3:(%) ⊢ %;
nnormalize;
- ##[ ##2: #H6; #H7; #H8; #H9; napply (bool_destruct ??? H9) ##]
+ ##[ ##2: #H6; #H7; #H8; #H9; napply (bool_destruct … H9) ##]
#H6; #H7; #H8; #H9; #H10;
- nrewrite > (H6 (refl_eq ??));
- nrewrite > (H7 (refl_eq ??));
- nrewrite > (H8 (refl_eq ??));
- nrewrite > (H10 (refl_eq ??));
+ nrewrite > (H6 (refl_eq …));
+ nrewrite > (H7 (refl_eq …));
+ nrewrite > (H8 (refl_eq …));
+ nrewrite > (H10 (refl_eq …));
nrewrite > (H5 w1 w2 H9);
- napply (refl_eq ??).
+ napply refl_eq.
nqed.