notation > "hvbox (x \natur term 90 r y)" with precedence 45 for @{'satisfy $r $x $y}.
interpretation "relation applied" 'satisfy r x y = (fun21 ___ (satisfy __ r) x y).
-definition binary_relation_setoid: SET → SET → SET1.
+definition binary_relation_setoid: SET → SET → setoid1.
intros (A B);
constructor 1;
[ apply (binary_relation A B)
assumption]]
qed.
+definition binary_relation_of_binary_relation_setoid :
+ ∀A,B.binary_relation_setoid A B → binary_relation A B ≝ λA,B,c.c.
+coercion binary_relation_of_binary_relation_setoid.
+
definition composition:
∀A,B,C.
binary_morphism1 (binary_relation_setoid A B) (binary_relation_setoid B C) (binary_relation_setoid A C).
[ intros (R12 R23);
constructor 1;
constructor 1;
- [ alias symbol "and" = "and_morphism".
- (* carr to avoid universe inconsistency *)
- apply (λs1:carr A.λs3:carr C.∃s2:carr B. s1 ♮R12 s2 ∧ s2 ♮R23 s3);
+ [ apply (λs1:A.λs3:C.∃s2:B. s1 ♮R12 s2 ∧ s2 ♮R23 s3);
| intros;
split; intro; cases e2 (w H3); clear e2; exists; [1,3: apply w ]
- [ apply (. (e‡#)‡(#‡e1)); assumption
- | apply (. ((e \sup -1)‡#)‡(#‡(e1 \sup -1))); assumption]]
+ [ apply (. (e^-1‡#)‡(#‡e1^-1)); assumption
+ | apply (. (e‡#)‡(#‡e1)); assumption]]
| intros 8; split; intro H2; simplify in H2 ⊢ %;
cases H2 (w H3); clear H2; exists [1,3: apply w] cases H3 (H2 H4); clear H3;
[ lapply (if ?? (e x w) H2) | lapply (fi ?? (e x w) H2) ]
|6,7: intros 5; unfold composition; simplify; split; intro;
unfold setoid1_of_setoid in x y; simplify in x y;
[1,3: cases e (w H1); clear e; cases H1; clear H1; unfold;
- [ apply (. (e ^ -1 : eq1 ? w x)‡#); assumption
- | apply (. #‡(e : eq1 ? w y)); assumption]
+ [ apply (. (e : eq1 ? x w)‡#); assumption
+ | apply (. #‡(e : eq1 ? w y)^-1); assumption]
|2,4: exists; try assumption; split;
(* change required to avoid universe inconsistency *)
change in x with (carr o1); change in y with (carr o2);
first [apply refl | assumption]]]
qed.
+(*
+definition setoid_of_REL : objs1 REL → setoid ≝ λx.x.
+coercion setoid_of_REL.
+*)
+
+definition binary_relation_setoid_of_arrow1_REL :
+ ∀P,Q. arrows1 REL P Q → binary_relation_setoid P Q ≝ λP,Q,x.x.
+coercion binary_relation_setoid_of_arrow1_REL.
+
definition full_subset: ∀s:REL. Ω \sup s.
apply (λs.{x | True});
intros; simplify; split; intro; assumption.
coercion full_subset.
-definition setoid1_of_REL: REL → setoid ≝ λS. S.
-coercion setoid1_of_REL.
-
-lemma Type_OF_setoid1_of_REL: ∀o1:Type_OF_category1 REL. Type_OF_objs1 o1 → Type_OF_setoid1 ?(*(setoid1_of_SET o1)*).
- [ apply (setoid1_of_SET o1);
- | intros; apply t;]
-qed.
-coercion Type_OF_setoid1_of_REL.
-
definition comprehension: ∀b:REL. (unary_morphism1 b CPROP) → Ω \sup b.
apply (λb:REL. λP: b ⇒ CPROP. {x | P x});
intros; simplify;
[ intros; simplify; apply (.= (e‡#)); apply refl1
| intros; simplify; split; intros; simplify;
[ change with (∀x. x ♮a b → x ♮a' b'); intros;
- apply (. (#‡e1)); whd in e; apply (if ?? (e ??)); assumption
+ apply (. (#‡e1^-1)); whd in e; apply (if ?? (e ??)); assumption
| change with (∀x. x ♮a' b' → x ♮a b); intros;
- apply (. (#‡e1\sup -1)); whd in e; apply (fi ?? (e ??));assumption]]
+ apply (. (#‡e1)); whd in e; apply (fi ?? (e ??));assumption]]
qed.
(*
definition extS: ∀X,S:REL. ∀r: arrows1 ? X S. Ω \sup S ⇒ Ω \sup X.
(* the same as ⋄ for a basic pair *)
definition image: ∀U,V:REL. binary_morphism1 (arrows1 ? U V) (Ω \sup U) (Ω \sup V).
intros; constructor 1;
- [ apply (λr: arrows1 ? U V.λS: Ω \sup U. {y | ∃x:carr U. x ♮r y ∧ x ∈ S });
+ [ apply (λr: arrows1 ? U V.λS: Ω \sup U. {y | ∃x:U. x ♮r y ∧ x ∈ S });
intros; simplify; split; intro; cases e1; exists [1,3: apply w]
- [ apply (. (#‡e)‡#); assumption
- | apply (. (#‡e ^ -1)‡#); assumption]
+ [ apply (. (#‡e^-1)‡#); assumption
+ | apply (. (#‡e)‡#); assumption]
| intros; split; simplify; intros; cases e2; exists [1,3: apply w]
- [ apply (. #‡(#‡e1)); cases x; split; try assumption;
+ [ apply (. #‡(#‡e1^-1)); cases x; split; try assumption;
apply (if ?? (e ??)); assumption
- | apply (. #‡(#‡e1 ^ -1)); cases x; split; try assumption;
+ | apply (. #‡(#‡e1)); cases x; split; try assumption;
apply (if ?? (e ^ -1 ??)); assumption]]
qed.
(* the same as □ for a basic pair *)
definition minus_star_image: ∀U,V:REL. binary_morphism1 (arrows1 ? U V) (Ω \sup U) (Ω \sup V).
intros; constructor 1;
- [ apply (λr: arrows1 ? U V.λS: Ω \sup U. {y | ∀x:carr U. x ♮r y → x ∈ S});
+ [ apply (λr: arrows1 ? U V.λS: Ω \sup U. {y | ∀x:U. x ♮r y → x ∈ S});
intros; simplify; split; intros; apply f;
- [ apply (. #‡e ^ -1); assumption
- | apply (. #‡e); assumption]
- | intros; split; simplify; intros; [ apply (. #‡e1); | apply (. #‡e1 ^ -1)]
+ [ apply (. #‡e); assumption
+ | apply (. #‡e ^ -1); assumption]
+ | intros; split; simplify; intros; [ apply (. #‡e1^ -1); | apply (. #‡e1 )]
apply f; [ apply (if ?? (e ^ -1 ??)); | apply (if ?? (e ??)) ] assumption]
qed.
(* the same as Rest for a basic pair *)
definition star_image: ∀U,V:REL. binary_morphism1 (arrows1 ? U V) (Ω \sup V) (Ω \sup U).
intros; constructor 1;
- [ apply (λr: arrows1 ? U V.λS: Ω \sup V. {x | ∀y:carr V. x ♮r y → y ∈ S});
+ [ apply (λr: arrows1 ? U V.λS: Ω \sup V. {x | ∀y:V. x ♮r y → y ∈ S});
intros; simplify; split; intros; apply f;
- [ apply (. e ^ -1‡#); assumption
- | apply (. e‡#); assumption]
- | intros; split; simplify; intros; [ apply (. #‡e1); | apply (. #‡e1 ^ -1)]
+ [ apply (. e ‡#); assumption
+ | apply (. e^ -1‡#); assumption]
+ | intros; split; simplify; intros; [ apply (. #‡e1 ^ -1); | apply (. #‡e1)]
apply f; [ apply (if ?? (e ^ -1 ??)); | apply (if ?? (e ??)) ] assumption]
qed.
definition minus_image: ∀U,V:REL. binary_morphism1 (arrows1 ? U V) (Ω \sup V) (Ω \sup U).
intros; constructor 1;
[ apply (λr: arrows1 ? U V.λS: Ω \sup V. {x | (*∃x:U. x ♮r y ∧ x ∈ S*)
- exT ? (λy:carr V.x ♮r y ∧ y ∈ S) });
+ exT ? (λy:V.x ♮r y ∧ y ∈ S) });
intros; simplify; split; intro; cases e1; exists [1,3: apply w]
- [ apply (. (e‡#)‡#); assumption
- | apply (. (e ^ -1‡#)‡#); assumption]
+ [ apply (. (e ^ -1‡#)‡#); assumption
+ | apply (. (e‡#)‡#); assumption]
| intros; split; simplify; intros; cases e2; exists [1,3: apply w]
- [ apply (. #‡(#‡e1)); cases x; split; try assumption;
+ [ apply (. #‡(#‡e1 ^ -1)); cases x; split; try assumption;
apply (if ?? (e ??)); assumption
- | apply (. #‡(#‡e1 ^ -1)); cases x; split; try assumption;
+ | apply (. #‡(#‡e1)); cases x; split; try assumption;
apply (if ?? (e ^ -1 ??)); assumption]]
qed.
projects / helm.git / blobdiff