include "bishop_set.ma".
-coercion cic:/matita/dama/bishop_set/eq_sym.con.
+coercion eq_sym.
lemma eq_trans:∀E:bishop_set.∀x,z,y:E.x ≈ y → y ≈ z → x ≈ z ≝
λE,x,y,z.eq_trans_ E x z y.
notation > "'Eq'≈" non associative with precedence 50
for @{'eqrewrite}.
-interpretation "eq_rew" 'eqrewrite =
- (cic:/matita/dama/bishop_set/eq_trans.con _ _ _).
+interpretation "eq_rew" 'eqrewrite = (eq_trans _ _ _).
lemma le_rewl: ∀E:ordered_set.∀z,y,x:E. x ≈ y → x ≤ z → y ≤ z.
-intros (E z y x Exy Lxz); apply (le_transitive ???? ? Lxz);
+intros (E z y x Exy Lxz); apply (le_transitive ??? ? Lxz);
intro Xyz; apply Exy; right; assumption;
qed.
lemma le_rewr: ∀E:ordered_set.∀z,y,x:E. x ≈ y → z ≤ x → z ≤ y.
-intros (E z y x Exy Lxz); apply (le_transitive ???? Lxz);
+intros (E z y x Exy Lxz); apply (le_transitive ??? Lxz);
intro Xyz; apply Exy; left; assumption;
qed.
notation > "'Le'≪" non associative with precedence 50 for @{'lerewritel}.
-interpretation "le_rewl" 'lerewritel = (cic:/matita/dama/bishop_set_rewrite/le_rewl.con _ _ _).
+interpretation "le_rewl" 'lerewritel = (le_rewl _ _ _).
notation > "'Le'≫" non associative with precedence 50 for @{'lerewriter}.
-interpretation "le_rewr" 'lerewriter = (cic:/matita/dama/bishop_set_rewrite/le_rewr.con _ _ _).
+interpretation "le_rewr" 'lerewriter = (le_rewr _ _ _).
lemma ap_rewl: ∀A:bishop_set.∀x,z,y:A. x ≈ y → y # z → x # z.
intros (A x z y Exy Ayz); cases (bs_cotransitive ???x Ayz); [2:assumption]
qed.
notation > "'Ap'≪" non associative with precedence 50 for @{'aprewritel}.
-interpretation "ap_rewl" 'aprewritel = (cic:/matita/dama/bishop_set_rewrite/ap_rewl.con _ _ _).
+interpretation "ap_rewl" 'aprewritel = (ap_rewl _ _ _).
notation > "'Ap'≫" non associative with precedence 50 for @{'aprewriter}.
-interpretation "ap_rewr" 'aprewriter = (cic:/matita/dama/bishop_set_rewrite/ap_rewr.con _ _ _).
+interpretation "ap_rewr" 'aprewriter = (ap_rewr _ _ _).
lemma exc_rewl: ∀A:ordered_set.∀x,z,y:A. x ≈ y → y ≰ z → x ≰ z.
-intros (A x z y Exy Ayz); cases (os_cotransitive ??? x Ayz); [2:assumption]
+intros (A x z y Exy Ayz); cases (exc_cotransitive ?? x Ayz); [2:assumption]
cases Exy; right; assumption;
qed.
lemma exc_rewr: ∀A:ordered_set.∀x,z,y:A. x ≈ y → z ≰ y → z ≰ x.
-intros (A x z y Exy Azy); cases (os_cotransitive ???x Azy); [assumption]
+intros (A x z y Exy Azy); cases (exc_cotransitive ??x Azy); [assumption]
cases (Exy); left; assumption;
qed.
notation > "'Ex'≪" non associative with precedence 50 for @{'ordered_setrewritel}.
-interpretation "exc_rewl" 'ordered_setrewritel = (cic:/matita/dama/bishop_set_rewrite/exc_rewl.con _ _ _).
+interpretation "exc_rewl" 'ordered_setrewritel = (exc_rewl _ _ _).
notation > "'Ex'≫" non associative with precedence 50 for @{'ordered_setrewriter}.
-interpretation "exc_rewr" 'ordered_setrewriter = (cic:/matita/dama/bishop_set_rewrite/exc_rewr.con _ _ _).
-
+interpretation "exc_rewr" 'ordered_setrewriter = (exc_rewr _ _ _).
+(*
lemma lt_rewr: ∀A:ordered_set.∀x,z,y:A. x ≈ y → z < y → z < x.
intros (A x y z E H); split; cases H;
[apply (Le≫ ? (eq_sym ??? E));|apply (Ap≫ ? E)] assumption;
qed.
notation > "'Lt'≪" non associative with precedence 50 for @{'ltrewritel}.
-interpretation "lt_rewl" 'ltrewritel = (cic:/matita/dama/bishop_set_rewrite/lt_rewl.con _ _ _).
+interpretation "lt_rewl" 'ltrewritel = (lt_rewl _ _ _).
notation > "'Lt'≫" non associative with precedence 50 for @{'ltrewriter}.
-interpretation "lt_rewr" 'ltrewriter = (cic:/matita/dama/bishop_set_rewrite/lt_rewr.con _ _ _).
-
+interpretation "lt_rewr" 'ltrewriter = (lt_rewr _ _ _).
+*)
projects / helm.git / blobdiff