qed.
definition carrier_of_relation_class : ∀X. X_Relation_Class X → Type.
- intros (X x); cases x; clear x; [2,4:clear x1] clear X; assumption.
+ intros (X x); cases x (A o o o o A o o A o o o A o A); exact A.
qed.
definition relation_of_relation_class:
∀X,R. carrier_of_relation_class X R → carrier_of_relation_class X R → Prop.
- intros 2; cases R; simplify; [1,2,3,4: assumption | apply (eq T) ]
+intros 2; cases R; simplify; [1,2,3,4: assumption | apply (eq T) ]
qed.
lemma about_carrier_of_relation_class_and_relation_class_of_argument_class :
∀R.
carrier_of_relation_class ? (relation_class_of_argument_class R) =
carrier_of_relation_class ? R.
- intro; cases R; reflexivity.
+intro; cases R; reflexivity.
qed.
inductive nelistT (A : Type) : Type :=
generalize in match f; clear f;
elim In;
[ unfold make_compatibility_goal;
- simplify;
- intros;
- whd;
+ whd; intros;
reflexivity
| simplify;
intro;
unfold transitive in H;
unfold symmetric in sym;
intro;
- auto new
+ [ apply (H x2 x1 x3 ? ?);
+ [apply (sym x1 x2 ?).
+ apply (H1).
+ |apply (H x1 x x3 ? ?);
+ [apply (H3).
+ |apply (H2).
+ ]
+ ]
+ | apply (H x1 x3 x ? ?);
+ [apply (H x1 x2 x3 ? ?);
+ [apply (H1).
+ |apply (H3).
+ ]
+ |apply (sym x x3 ?).
+ apply (H2).
+ ]
+ ]
].
qed.
intro;
unfold transitive in H;
unfold symmetric in sym;
- auto depth=4.
+ [ apply (H x2 x1 x3 ? ?);
+ [apply (sym x1 x2 ?).
+ apply (H1).
+ |apply (H x1 x x3 ? ?);
+ [apply (H3).
+ |apply (H2).
+ ]
+ ]
+ | apply (H x1 x2 x ? ?);
+ [apply (H1).
+ |apply (H x2 x3 x ? ?);
+ [apply (H3).
+ |apply (sym x x3 ?).
+ apply (H x x3 x3 ? ?);
+ [apply (H2).
+ |apply (refl x3).
+ ]
+ ]
+ ]
+ ]
]
qed.
intros;
whd;
intros;
- auto
+ apply (H x2 x1 x3 ? ?);
+ [apply (H1).
+ |apply (H x1 x x3 ? ?);
+ [apply (H3).
+ |apply (H2).
+ ]
+ ]
].
qed.
intros;
whd;
intro;
- auto
+ apply (H x2 x1 x3 ? ?);
+ [apply (H1).
+ |apply (H x1 x x3 ? ?);
+ [apply (H3).
+ |apply (H2).
+ ]
+ ]
].
qed.
whd;
unfold impl;
intros;
- auto.
+ apply (H1 ?).apply (H ?).apply (H2).
+ autobatch.
qed.
(*DA PORTARE: Add Relation Prop impl
definition get_rewrite_direction: rewrite_direction → Argument_Class → rewrite_direction.
intros (dir R);
- cases (variance_of_argument_class R);
+ cases (variance_of_argument_class R) (a);
[ exact dir
| cases a;
[ exact dir (* covariant *)
| intros;
change in p with (Prod (carrier_of_relation_class variance t) (product_of_arguments n));
change in p1 with (Prod (carrier_of_relation_class variance t) (product_of_arguments n));
- cases p;
- cases p1;
+ cases p (c p2);
+ cases p1 (c1 p3);
apply And;
[ exact
- (directed_relation_of_argument_class (get_rewrite_direction r t) t a a1)
- | exact (R b b1)
+ (directed_relation_of_argument_class (get_rewrite_direction r t) t c c1)
+ | exact (R p2 p3)
]
]
qed.
generalize in match args1; clear args1;
generalize in match m2; clear m2;
generalize in match m1; clear m1;
- elim t 0;
+ elim t 0; simplify;
[ intros (T1 r Hs Hr m1 m2 args1 args2 H H1);
- simplify in H;
- simplify in H1;
- simplify;
apply H;
exact H1
| intros 8 (v T1 r Hr m1 m2 args1 args2);
- cases v;
+ cases v;
+ simplify;
intros (H H1);
- simplify in H1;
- apply H;
- exact H1
+ apply (H ? ? H1);
| intros;
apply H1;
exact H2
| intros 7 (v);
- cases v;
+ cases v; simplify;
intros (H H1);
- simplify in H1;
apply H;
exact H1
| intros;
directed_relation_of_relation_class Left2Right ?
(apply_morphism ? ? m1 args1)
(apply_morphism ? ? m2 args2).
- intro;
- elim In;
- [ simplify in m1 m2 args1 args2 ⊢ %;
- change in H1 with
+ intro;
+ elim In 0; simplify; intros;
+ [ change in H1 with
(directed_relation_of_argument_class
(get_rewrite_direction Left2Right t) t args1 args2);
generalize in match H1; clear H1;
generalize in match args1; clear args1;
generalize in match m2; clear m2;
generalize in match m1; clear m1;
- elim t 0;
+ elim t 0; simplify;
[ intros (T1 r Hs Hr m1 m2 args1 args2 H H1);
- simplify in H;
- simplify in H1;
- simplify;
apply H;
exact H1
| intros 8 (v T1 r Hr m1 m2 args1 args2);
generalize in match m1; clear m1;
elim t 0;
[ intros (T1 r Hs Hr m1 m2 H1 t1 t3 H3);
- simplify in H3;
change in H1 with
(∀x1,x2:T1.r x1 x2 → make_compatibility_goal_aux n Out (m1 x1) (m2 x2));
| intro v;
(* impl IS A MORPHISM *)
Add Morphism impl with signature iff ==> iff ==> iff as Impl_Morphism.
-unfold impl; tauto.
+unfold impl; tautobatch.
Qed.
(* and IS A MORPHISM *)
Add Morphism and with signature iff ==> iff ==> iff as And_Morphism.
- tauto.
+ tautobatch.
Qed.
(* or IS A MORPHISM *)
Add Morphism or with signature iff ==> iff ==> iff as Or_Morphism.
- tauto.
+ tautobatch.
Qed.
(* not IS A MORPHISM *)
Add Morphism not with signature iff ==> iff as Not_Morphism.
- tauto.
+ tautobatch.
Qed.
(* THE SAME EXAMPLES ON impl *)
Add Morphism and with signature impl ++> impl ++> impl as And_Morphism2.
- unfold impl; tauto.
+ unfold impl; tautobatch.
Qed.
Add Morphism or with signature impl ++> impl ++> impl as Or_Morphism2.
- unfold impl; tauto.
+ unfold impl; tautobatch.
Qed.
Add Morphism not with signature impl -→ impl as Not_Morphism2.
- unfold impl; tauto.
+ unfold impl; tautobatch.
Qed.
*)
projects / helm.git / blobdiff