include "o-algebra.ma".
-alias symbol "eq" = "setoid1 eq".
-definition is_o_saturation: ∀C:OA. unary_morphism1 C C → CProp1 ≝
- λC:OA.λA:unary_morphism1 C C.
- ∀U,V. (U ≤ A V) = (A U ≤ A V).
+definition is_o_saturation: ∀C:OA. C ⇒_1 C → CProp1 ≝
+ λC:OA.λA:C ⇒_1 C.∀U,V. (U ≤ A V) =_1 (A U ≤ A V).
-definition is_o_reduction: ∀C:OA. unary_morphism1 C C → CProp1 ≝
- λC:OA.λJ:unary_morphism1 C C.
- ∀U,V. (J U ≤ V) = (J U ≤ J V).
+definition is_o_reduction: ∀C:OA. C ⇒_1 C → CProp1 ≝
+ λC:OA.λJ:C ⇒_1 C.∀U,V. (J U ≤ V) =_1 (J U ≤ J V).
theorem o_saturation_expansive: ∀C,A. is_o_saturation C A → ∀U. U ≤ A U.
intros; apply (fi ?? (i ??)); apply (oa_leq_refl C).
qed.
-theorem o_saturation_monotone:
- ∀C,A. is_o_saturation C A →
- ∀U,V. U ≤ V → A U ≤ A V.
+theorem o_saturation_monotone: ∀C:OA.∀A:C ⇒_1 C. is_o_saturation C A → ∀U,V. U ≤ V → A U ≤ A V.
intros; apply (if ?? (i ??)); apply (oa_leq_trans C);
[apply V|3: apply o_saturation_expansive ]
assumption.
qed.
-theorem o_saturation_idempotent: ∀C,A. is_o_saturation C A → ∀U.
- eq1 C (A (A U)) (A U).
+theorem o_saturation_idempotent: ∀C:OA.∀A:C ⇒_1 C. is_o_saturation C A → ∀U. A (A U) =_1 A U.
intros; apply (oa_leq_antisym C);
[ apply (if ?? (i (A U) U)); apply (oa_leq_refl C).
| apply o_saturation_expansive; assumption]
projects / helm.git / blobdiff