definition injective: \forall A,B:Type.\forall f:A \to B.Prop
\def \lambda A,B.\lambda f.
- \forall x,y:A.eq B (f x) (f y) \to (eq A x y).
+ \forall x,y:A.f x = f y \to x=y.
(* we have still to attach exists *)
definition surjective: \forall A,B:Type.\forall f:A \to B.Prop
\def \lambda A,B.\lambda f.
- \forall z:B.ex A (\lambda x:A.(eq B z (f x))).
+ \forall z:B.ex A (\lambda x:A.z=f x).
definition symmetric: \forall A:Type.\forall f:A \to A\to A.Prop
-\def \lambda A.\lambda f.\forall x,y.eq A (f x y) (f y x).
+\def \lambda A.\lambda f.\forall x,y.f x y = f y x.
definition associative: \forall A:Type.\forall f:A \to A\to A.Prop
-\def \lambda A.\lambda f.\forall x,y,z.eq A (f (f x y) z) (f x (f y z)).
+\def \lambda A.\lambda f.\forall x,y,z.f (f x y) z = f x (f y z).
(* functions and relations *)
definition monotonic : \forall A:Type.\forall R:A \to A \to Prop.
(* functions and functions *)
definition distributive: \forall A:Type.\forall f,g:A \to A \to A.Prop
-\def \lambda A.\lambda f,g.\forall x,y,z:A.eq A (f x (g y z)) (g (f x y) (f x z)).
+\def \lambda A.\lambda f,g.\forall x,y,z:A. f x (g y z) = g (f x y) (f x z).
definition antisymmetric: \forall A:Type.\forall R:A \to A \to Prop.Prop
\def
-\lambda A.\lambda R.\forall x,y:A.R x y \to R y x \to (eq A x y).
+\lambda A.\lambda R.\forall x,y:A.R x y \to R y x \to x=y.
inductive eq (A:Type) (x:A) : A \to Prop \def
refl_eq : eq A x x.
+
+interpretation "leibnitz's equality"
+ 'eq x y = (cic:/matita/logic/equality/eq.ind#xpointer(1/1) _ x y).
+alias symbol "eq" (instance 0) = "leibnitz's equality".
+
theorem reflexive_eq : \forall A:Type. reflexive A (eq A).
simplify.intros.apply refl_eq.
simplify.intros.elim H. apply refl_eq.
qed.
-theorem sym_eq : \forall A:Type.\forall x,y:A. eq A x y \to eq A y x
+theorem sym_eq : \forall A:Type.\forall x,y:A. x=y \to y=x
\def symmetric_eq.
theorem transitive_eq : \forall A:Type. transitive A (eq A).
simplify.intros.elim H1.assumption.
qed.
-theorem trans_eq : \forall A:Type.\forall x,y,z:A. eq A x y \to eq A y z \to eq A x z
+theorem trans_eq : \forall A:Type.\forall x,y,z:A. x=y \to y=z \to x=z
\def transitive_eq.
theorem eq_elim_r:
\forall A:Type.\forall x:A. \forall P: A \to Prop.
- P x \to \forall y:A. eq A y x \to P y.
+ P x \to \forall y:A. y=x \to P y.
intros. elim sym_eq ? ? ? H1.assumption.
qed.
cic:/matita/logic/equality/eq_elim_r.con.
theorem eq_f: \forall A,B:Type.\forall f:A\to B.
-\forall x,y:A. eq A x y \to eq B (f x) (f y).
+\forall x,y:A. x=y \to (f x)=(f y).
intros.elim H.reflexivity.
qed.
theorem eq_f2: \forall A,B,C:Type.\forall f:A\to B \to C.
\forall x1,x2:A. \forall y1,y2:B.
-eq A x1 x2\to eq B y1 y2\to eq C (f x1 y1) (f x2 y2).
+x1=x2 \to y1=y2 \to (f x1 y1)=(f x2 y2).
intros.elim H1.elim H.reflexivity.
-qed.
\ No newline at end of file
+qed.
[ O \Rightarrow GT
| (S q) \Rightarrow nat_compare p q]].
-theorem nat_compare_n_n: \forall n:nat.(eq compare (nat_compare n n) EQ).
+theorem nat_compare_n_n: \forall n:nat. nat_compare n n = EQ.
intro.elim n.
simplify.reflexivity.
simplify.assumption.
qed.
theorem nat_compare_S_S: \forall n,m:nat.
-eq compare (nat_compare n m) (nat_compare (S n) (S m)).
+nat_compare n m = nat_compare (S n) (S m).
intros.simplify.reflexivity.
qed.
theorem nat_compare_to_Prop: \forall n,m:nat.
match (nat_compare n m) with
[ LT \Rightarrow (lt n m)
- | EQ \Rightarrow (eq nat n m)
+ | EQ \Rightarrow n=m
| GT \Rightarrow (lt m n) ].
intros.
apply nat_elim2 (\lambda n,m.match (nat_compare n m) with
[ LT \Rightarrow (lt n m)
- | EQ \Rightarrow (eq nat n m)
+ | EQ \Rightarrow n=m
| GT \Rightarrow (lt m n) ]).
intro.elim n1.simplify.reflexivity.
simplify.apply le_S_S.apply le_O_n.
qed.
theorem nat_compare_n_m_m_n: \forall n,m:nat.
-eq compare (nat_compare n m) (compare_invert (nat_compare m n)).
+nat_compare n m = compare_invert (nat_compare m n).
intros.
-apply nat_elim2 (\lambda n,m.eq compare (nat_compare n m) (compare_invert (nat_compare m n))).
+apply nat_elim2 (\lambda n,m. nat_compare n m = compare_invert (nat_compare m n)).
intros.elim n1.simplify.reflexivity.
simplify.reflexivity.
intro.elim n1.simplify.reflexivity.
qed.
theorem nat_compare_elim : \forall n,m:nat. \forall P:compare \to Prop.
-((lt n m) \to (P LT)) \to ((eq nat n m) \to (P EQ)) \to ((lt m n) \to (P GT)) \to
+((lt n m) \to (P LT)) \to (n=m \to (P EQ)) \to ((lt m n) \to (P GT)) \to
(P (nat_compare n m)).
intros.
cut match (nat_compare n m) with
[ LT \Rightarrow (lt n m)
-| EQ \Rightarrow (eq nat n m)
+| EQ \Rightarrow n=m
| GT \Rightarrow (lt m n)] \to
(P (nat_compare n m)).
apply Hcut.apply nat_compare_to_Prop.
qed.
theorem div_aux_mod_aux: \forall p,n,m:nat.
-(eq nat n (plus (times (div_aux p n m) (S m)) (mod_aux p n m) )).
+(n=plus (times (div_aux p n m) (S m)) (mod_aux p n m)).
intro.elim p.
simplify.elim leb n m.
simplify.apply refl_eq.
simplify.intro.
rewrite > assoc_plus.
elim (H (minus n1 (S m)) m).
-change with (eq nat n1 (plus (S m) (minus n1 (S m)))).
+change with (n1=plus (S m) (minus n1 (S m))).
rewrite < sym_plus.
apply plus_minus_m_m.
change with lt m n1.
qed.
theorem div_mod: \forall n,m:nat.
-(lt O m) \to (eq nat n (plus (times (div n m) m) (mod n m))).
+(lt O m) \to n=plus (times (div n m) m) (mod n m).
intros 2.elim m.elim (not_le_Sn_O O H).
simplify.
apply div_aux_mod_aux.
inductive div_mod_spec (n,m,q,r:nat) : Prop \def
div_mod_spec_intro:
-(lt r m) \to (eq nat n (plus (times q m) r)) \to (div_mod_spec n m q r).
+(lt r m) \to n=plus (times q m) r \to (div_mod_spec n m q r).
(*
definition div_mod_spec : nat \to nat \to nat \to nat \to Prop \def
-\lambda n,m,q,r:nat.(And (lt r m) (eq nat n (plus (times q m) r))).
+\lambda n,m,q,r:nat.(And (lt r m) n=plus (times q m) r).
*)
-theorem div_mod_spec_to_not_eq_O: \forall n,m,q,r.(div_mod_spec n m q r) \to Not (eq nat m O).
+theorem div_mod_spec_to_not_eq_O: \forall n,m,q,r.(div_mod_spec n m q r) \to Not (m=O).
intros 4.simplify.intros.elim H.absurd le (S r) O.
rewrite < H1.assumption.
exact not_le_Sn_O r.
apply le_times_r.
apply lt_to_le.
apply H6.
-qed.
\ No newline at end of file
+qed.
| (S q) \Rightarrow minus p q ]].
-theorem minus_n_O: \forall n:nat.eq nat n (minus n O).
+theorem minus_n_O: \forall n:nat.n=minus n O.
intros.elim n.simplify.reflexivity.
simplify.reflexivity.
qed.
-theorem minus_n_n: \forall n:nat.eq nat O (minus n n).
+theorem minus_n_n: \forall n:nat.O=minus n n.
intros.elim n.simplify.
reflexivity.
simplify.apply H.
qed.
-theorem minus_Sn_n: \forall n:nat.eq nat (S O) (minus (S n) n).
+theorem minus_Sn_n: \forall n:nat. S O = minus (S n) n.
intro.elim n.
simplify.reflexivity.
elim H.reflexivity.
qed.
theorem minus_Sn_m: \forall n,m:nat.
-le m n \to eq nat (minus (S n) m) (S (minus n m)).
+le m n \to minus (S n) m = S (minus n m).
intros 2.
apply nat_elim2
-(\lambda n,m.le m n \to eq nat (minus (S n) m) (S (minus n m))).
+(\lambda n,m.le m n \to minus (S n) m = S (minus n m)).
intros.apply le_n_O_elim n1 H.
simplify.reflexivity.
intros.simplify.reflexivity.
qed.
theorem plus_minus:
-\forall n,m,p:nat. le m n \to eq nat (plus (minus n m) p) (minus (plus n p) m).
+\forall n,m,p:nat. le m n \to plus (minus n m) p = minus (plus n p) m.
intros 2.
apply nat_elim2
-(\lambda n,m.\forall p:nat.le m n \to eq nat (plus (minus n m) p) (minus (plus n p) m)).
+(\lambda n,m.\forall p:nat.le m n \to plus (minus n m) p = minus (plus n p) m).
intros.apply le_n_O_elim ? H.
simplify.rewrite < minus_n_O.reflexivity.
intros.simplify.reflexivity.
qed.
theorem plus_minus_m_m: \forall n,m:nat.
-le m n \to eq nat n (plus (minus n m) m).
+le m n \to n = plus (minus n m) m.
intros 2.
-apply nat_elim2 (\lambda n,m.le m n \to eq nat n (plus (minus n m) m)).
+apply nat_elim2 (\lambda n,m.le m n \to n = plus (minus n m) m).
intros.apply le_n_O_elim n1 H.
reflexivity.
intros.simplify.rewrite < plus_n_O.reflexivity.
apply le_S_S_to_le.assumption.
qed.
-theorem minus_to_plus :\forall n,m,p:nat.le m n \to eq nat (minus n m) p \to
-eq nat n (plus m p).
+theorem minus_to_plus :\forall n,m,p:nat.le m n \to minus n m = p \to
+n = plus m p.
intros.apply trans_eq ? ? (plus (minus n m) m) ?.
apply plus_minus_m_m.
apply H.elim H1.
qed.
theorem plus_to_minus :\forall n,m,p:nat.le m n \to
-eq nat n (plus m p) \to eq nat (minus n m) p.
+n = plus m p \to minus n m = p.
intros.
apply inj_plus_r m.
rewrite < H1.
qed.
theorem eq_minus_n_m_O: \forall n,m:nat.
-le n m \to eq nat (minus n m) O.
+le n m \to minus n m = O.
intros 2.
-apply nat_elim2 (\lambda n,m.le n m \to eq nat (minus n m) O).
+apply nat_elim2 (\lambda n,m.le n m \to minus n m = O).
intros.simplify.reflexivity.
intros.apply False_ind.
(* ancora problemi con il not *)
simplify.
intros.
apply (leb_elim z y).intro.
-cut eq nat (plus (times x (minus y z)) (times x z))
- (plus (minus (times x y) (times x z)) (times x z)).
+cut plus (times x (minus y z)) (times x z) =
+ plus (minus (times x y) (times x z)) (times x z).
apply inj_plus_l (times x z).
assumption.
apply trans_eq nat ? (times x y).
qed.
theorem distr_times_minus: \forall n,m,p:nat.
-eq nat (times n (minus m p)) (minus (times n m) (times n p))
+times n (minus m p) = minus (times n m) (times n p)
\def distributive_times_minus.
theorem le_minus_m: \forall n,m:nat. le (minus n m) n.
[ O \Rightarrow O
| (S p) \Rightarrow p ].
-theorem pred_Sn : \forall n:nat.
-(eq nat n (pred (S n))).
+theorem pred_Sn : \forall n:nat.n=(pred (S n)).
intros; reflexivity.
qed.
apply eq_f. assumption.
qed.
-theorem inj_S : \forall n,m:nat.
-(eq nat (S n) (S m)) \to (eq nat n m)
+theorem inj_S : \forall n,m:nat.(S n)=(S m) \to n=m
\def injective_S.
theorem not_eq_S : \forall n,m:nat.
-Not (eq nat n m) \to Not (eq nat (S n) (S m)).
+Not (n=m) \to Not (S n = S m).
intros. simplify. intros.
apply H. apply injective_S. assumption.
qed.
[ O \Rightarrow False
| (S p) \Rightarrow True ].
-theorem not_eq_O_S : \forall n:nat. Not (eq nat O (S n)).
+theorem not_eq_O_S : \forall n:nat. Not (O=S n).
intros. simplify. intros.
cut (not_zero O).
exact Hcut.
rewrite > H.exact I.
qed.
-theorem not_eq_n_Sn : \forall n:nat. Not (eq nat n (S n)).
+theorem not_eq_n_Sn : \forall n:nat. Not (n=S n).
intros.elim n.
apply not_eq_O_S.
apply not_eq_S.assumption.
qed.
(* ??? this needs not le *)
-theorem S_pred: \forall n:nat.lt O n \to eq nat n (S (pred n)).
+theorem S_pred: \forall n:nat.lt O n \to n=S (pred n).
intro.elim n.apply False_ind.exact not_le_Sn_O O H.
apply eq_f.apply pred_Sn.
qed.
qed.
(* le elimination *)
-theorem le_n_O_to_eq : \forall n:nat. (le n O) \to (eq nat O n).
+theorem le_n_O_to_eq : \forall n:nat. (le n O) \to O=n.
intro.elim n.reflexivity.
apply False_ind.
(* non si applica not_le_Sn_O *)
qed.
theorem le_n_Sm_elim : \forall n,m:nat.le n (S m) \to
-\forall P:Prop. (le (S n) (S m) \to P) \to (eq nat n (S m) \to P) \to P.
+\forall P:Prop. (le (S n) (S m) \to P) \to (n=(S m) \to P) \to P.
intros 4.elim H.
apply H2.reflexivity.
apply H3. apply le_S_S. assumption.
(* other abstract properties *)
theorem antisymmetric_le : antisymmetric nat le.
simplify.intros 2.
-apply nat_elim2 (\lambda n,m.((le n m) \to (le m n) \to eq nat n m)).
+apply nat_elim2 (\lambda n,m.((le n m) \to (le m n) \to n=m)).
intros.apply le_n_O_to_eq.assumption.
intros.apply False_ind.apply not_le_Sn_O ? H.
intros.apply eq_f.apply H.
apply le_S_S_to_le.assumption.
qed.
-theorem antisym_le: \forall n,m:nat. le n m \to le m n \to eq nat n m
+theorem antisym_le: \forall n,m:nat. le n m \to le m n \to n=m
\def antisymmetric_le.
theorem decidable_le: \forall n,m:nat. decidable (le n m).
intros 2.simplify.intro.elim H.
left.apply le_S_S.assumption.
right.intro.apply H1.apply le_S_S_to_le.assumption.
-qed.
\ No newline at end of file
+qed.
apply le_plus_l.apply le_O_n.
qed.
-theorem eq_plus_to_le: \forall n,m,p:nat.eq nat n (plus m p)
+theorem eq_plus_to_le: \forall n,m,p:nat.n=plus m p
\to le m n.
intros.rewrite > H.
rewrite < sym_plus.
[ O \Rightarrow m
| (S p) \Rightarrow S (plus p m) ].
-theorem plus_n_O: \forall n:nat. eq nat n (plus n O).
+theorem plus_n_O: \forall n:nat. n = plus n O.
intros.elim n.
simplify.reflexivity.
simplify.apply eq_f.assumption.
qed.
-theorem plus_n_Sm : \forall n,m:nat. eq nat (S (plus n m)) (plus n (S m)).
+theorem plus_n_Sm : \forall n,m:nat. S (plus n m) = plus n (S m).
intros.elim n.
simplify.reflexivity.
simplify.apply eq_f.assumption.
functions.moo why?
theorem symmetric_plus: symmetric nat plus. *)
-theorem sym_plus: \forall n,m:nat. eq nat (plus n m) (plus m n).
+theorem sym_plus: \forall n,m:nat. plus n m = plus m n.
intros.elim n.
simplify.apply plus_n_O.
simplify.rewrite > H.apply plus_n_Sm.
simplify.apply eq_f.assumption.
qed.
-theorem assoc_plus : \forall n,m,p:nat. eq nat (plus (plus n m) p) (plus n (plus m p))
+theorem assoc_plus : \forall n,m,p:nat. plus (plus n m) p = plus n (plus m p)
\def associative_plus.
theorem injective_plus_r: \forall n:nat.injective nat nat (\lambda m.plus n m).
apply H.apply inj_S.apply H1.
qed.
-theorem inj_plus_r: \forall p,n,m:nat.eq nat (plus p n) (plus p m) \to (eq nat n m)
+theorem inj_plus_r: \forall p,n,m:nat. plus p n = plus p m \to n=m
\def injective_plus_r.
theorem injective_plus_l: \forall m:nat.injective nat nat (\lambda n.plus n m).
assumption.
qed.
-theorem inj_plus_l: \forall p,n,m:nat.eq nat (plus n p) (plus m p) \to (eq nat n m)
+theorem inj_plus_l: \forall p,n,m:nat. plus n p = plus m p \to n=m
\def injective_plus_l.
[ O \Rightarrow O
| (S p) \Rightarrow (plus m (times p m)) ].
-theorem times_n_O: \forall n:nat. eq nat O (times n O).
+theorem times_n_O: \forall n:nat. O = times n O.
intros.elim n.
simplify.reflexivity.
simplify.assumption.
qed.
theorem times_n_Sm :
-\forall n,m:nat. eq nat (plus n (times n m)) (times n (S m)).
+\forall n,m:nat.plus n (times n m) = times n (S m).
intros.elim n.
simplify.reflexivity.
simplify.apply eq_f.rewrite < H.
theorem symmetric_times : symmetric nat times. *)
theorem sym_times :
-\forall n,m:nat. eq nat (times n m) (times m n).
+\forall n,m:nat.times n m = times m n.
intros.elim n.
simplify.apply times_n_O.
simplify.rewrite > H.apply times_n_Sm.
qed.
variant times_plus_distr: \forall n,m,p:nat.
-eq nat (times n (plus m p)) (plus (times n m) (times n p))
+times n (plus m p) = plus (times n m) (times n p)
\def distributive_times_plus.
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