--- /dev/null
+ (**************************************************************************)
+(* ___ *)
+(* ||M|| *)
+(* ||A|| A project by Andrea Asperti *)
+(* ||T|| *)
+(* ||I|| Developers: *)
+(* ||T|| The HELM team. *)
+(* ||A|| http://helm.cs.unibo.it *)
+(* \ / *)
+(* \ / This file is distributed under the terms of the *)
+(* v GNU General Public License Version 2 *)
+(* *)
+(**************************************************************************)
+
+include "formal_topology/o-algebra.ma".
+include "formal_topology/o-saturations.ma".
+
+record Obasic_topology: Type[2] ≝ {
+ Ocarrbt:> OA;
+ oA: Ocarrbt ⇒_2 Ocarrbt; oJ: Ocarrbt ⇒_2 Ocarrbt;
+ oA_is_saturation: is_o_saturation ? oA; oJ_is_reduction: is_o_reduction ? oJ;
+ Ocompatibility: ∀U,V. (oA U >< oJ V) =_1 (U >< oJ V)
+ }.
+
+record Ocontinuous_relation (S,T: Obasic_topology) : Type[2] ≝ {
+ Ocont_rel:> arrows2 OA S T;
+ Oreduced: ∀U:S. U = oJ ? U → Ocont_rel U =_1 oJ ? (Ocont_rel U);
+ Osaturated: ∀U:S. U = oA ? U → Ocont_rel⎻* U =_1 oA ? (Ocont_rel⎻* U)
+ }.
+
+definition Ocontinuous_relation_setoid: Obasic_topology → Obasic_topology → setoid2.
+ intros (S T); constructor 1;
+ [ apply (Ocontinuous_relation S T)
+ | constructor 1;
+ [ alias symbol "eq" = "setoid2 eq".
+ alias symbol "compose" = "category2 composition".
+ apply (λr,s:Ocontinuous_relation S T. (r⎻* ) ∘ (oA S) = (s⎻* ∘ (oA ?)));
+ | simplify; intros; apply refl2;
+ | simplify; intros; apply sym2; apply e
+ | simplify; intros; apply trans2; [2: apply e |3: apply e1; |1: skip]]]
+qed.
+
+definition Ocontinuous_relation_of_Ocontinuous_relation_setoid:
+ ∀P,Q. Ocontinuous_relation_setoid P Q → Ocontinuous_relation P Q ≝ λP,Q,c.c.
+coercion Ocontinuous_relation_of_Ocontinuous_relation_setoid.
+
+(*
+theorem continuous_relation_eq':
+ ∀o1,o2.∀a,a': continuous_relation_setoid o1 o2.
+ a = a' → ∀X.a⎻* (A o1 X) = a'⎻* (A o1 X).
+ intros; apply oa_leq_antisym; intro; unfold minus_star_image; simplify; intros;
+ [ cut (ext ?? a a1 ⊆ A ? X); [2: intros 2; apply (H1 a2); cases f1; assumption;]
+ lapply (if ?? (A_is_saturation ???) Hcut); clear Hcut;
+ cut (A ? (ext ?? a' a1) ⊆ A ? X); [2: apply (. (H ?)‡#); assumption]
+ lapply (fi ?? (A_is_saturation ???) Hcut);
+ apply (Hletin1 x); change with (x ∈ ext ?? a' a1); split; simplify;
+ [ apply I | assumption ]
+ | cut (ext ?? a' a1 ⊆ A ? X); [2: intros 2; apply (H1 a2); cases f1; assumption;]
+ lapply (if ?? (A_is_saturation ???) Hcut); clear Hcut;
+ cut (A ? (ext ?? a a1) ⊆ A ? X); [2: apply (. (H ?)\sup -1‡#); assumption]
+ lapply (fi ?? (A_is_saturation ???) Hcut);
+ apply (Hletin1 x); change with (x ∈ ext ?? a a1); split; simplify;
+ [ apply I | assumption ]]
+qed.
+
+theorem continuous_relation_eq_inv':
+ ∀o1,o2.∀a,a': continuous_relation_setoid o1 o2.
+ (∀X.a⎻* (A o1 X) = a'⎻* (A o1 X)) → a=a'.
+ intros 6;
+ cut (∀a,a': continuous_relation_setoid o1 o2.
+ (∀X.a⎻* (A o1 X) = a'⎻* (A o1 X)) →
+ ∀V:(oa_P (carrbt o2)). A o1 (a'⎻ V) ≤ A o1 (a⎻ V));
+ [2: clear b H a' a; intros;
+ lapply depth=0 (λV.saturation_expansive ??? (extS ?? a V)); [2: apply A_is_saturation;|skip]
+ (* fundamental adjunction here! to be taken out *)
+ cut (∀V:Ω \sup o2.V ⊆ minus_star_image ?? a (A ? (extS ?? a V)));
+ [2: intro; intros 2; unfold minus_star_image; simplify; intros;
+ apply (Hletin V1 x); whd; split; [ exact I | exists; [apply a1] split; assumption]]
+ clear Hletin;
+ cut (∀V:Ω \sup o2.V ⊆ minus_star_image ?? a' (A ? (extS ?? a V)));
+ [2: intro; apply (. #‡(H ?)); apply Hcut] clear H Hcut;
+ (* second half of the fundamental adjunction here! to be taken out too *)
+ intro; lapply (Hcut1 (singleton ? V)); clear Hcut1;
+ unfold minus_star_image in Hletin; unfold singleton in Hletin; simplify in Hletin;
+ whd in Hletin; whd in Hletin:(?→?→%); simplify in Hletin;
+ apply (if ?? (A_is_saturation ???));
+ intros 2 (x H); lapply (Hletin V ? x ?);
+ [ apply refl | cases H; assumption; ]
+ change with (x ∈ A ? (ext ?? a V));
+ apply (. #‡(†(extS_singleton ????)));
+ assumption;]
+ split; apply Hcut; [2: assumption | intro; apply sym1; apply H]
+qed.
+*)
+
+definition Ocontinuous_relation_comp:
+ ∀o1,o2,o3.
+ Ocontinuous_relation_setoid o1 o2 →
+ Ocontinuous_relation_setoid o2 o3 →
+ Ocontinuous_relation_setoid o1 o3.
+ intros (o1 o2 o3 r s); constructor 1;
+ [ apply (s ∘ r);
+ | intros;
+ apply sym1;
+ change in match ((s ∘ r) U) with (s (r U));
+ apply (.= (Oreduced : ?)^-1);
+ [ apply (.= (Oreduced :?)); [ assumption | apply refl1 ]
+ | apply refl1]
+ | intros;
+ apply sym1;
+ change in match ((s ∘ r)⎻* U) with (s⎻* (r⎻* U));
+ apply (.= (Osaturated : ?)^-1);
+ [ apply (.= (Osaturated : ?)); [ assumption | apply refl1 ]
+ | apply refl1]]
+qed.
+
+definition OBTop: category2.
+ constructor 1;
+ [ apply Obasic_topology
+ | apply Ocontinuous_relation_setoid
+ | intro; constructor 1;
+ [ apply id2
+ | intros; apply e;
+ | intros; apply e;]
+ | intros; constructor 1;
+ [ apply Ocontinuous_relation_comp;
+ | intros; simplify;
+ change with ((b⎻* ∘ a⎻* ) ∘ oA o1 = ((b'⎻* ∘ a'⎻* ) ∘ oA o1));
+ change with (b⎻* ∘ (a⎻* ∘ oA o1) = b'⎻* ∘ (a'⎻* ∘ oA o1));
+ change in e with (a⎻* ∘ oA o1 = a'⎻* ∘ oA o1);
+ change in e1 with (b⎻* ∘ oA o2 = b'⎻* ∘ oA o2);
+ apply (.= e‡#);
+ intro x;
+ change with (b⎻* (a'⎻* (oA o1 x)) =_1 b'⎻*(a'⎻* (oA o1 x)));
+ apply (.= †(Osaturated o1 o2 a' (oA o1 x) ?)); [
+ apply ((o_saturation_idempotent ?? (oA_is_saturation o1) x)^-1);]
+ apply (.= (e1 (a'⎻* (oA o1 x))));
+ change with (b'⎻* (oA o2 (a'⎻* (oA o1 x))) =_1 b'⎻*(a'⎻* (oA o1 x)));
+ apply (.= †(Osaturated o1 o2 a' (oA o1 x):?)^-1); [
+ apply ((o_saturation_idempotent ?? (oA_is_saturation o1) x)^-1);]
+ apply rule #;]
+ | intros; simplify;
+ change with (((a34⎻* ∘ a23⎻* ) ∘ a12⎻* ) ∘ oA o1 = ((a34⎻* ∘ (a23⎻* ∘ a12⎻* )) ∘ oA o1));
+ apply rule (#‡ASSOC ^ -1);
+ | intros; simplify;
+ change with ((a⎻* ∘ (id2 ? o1)⎻* ) ∘ oA o1 = a⎻* ∘ oA o1);
+ apply (#‡(id_neutral_right2 : ?));
+ | intros; simplify;
+ change with (((id2 ? o2)⎻* ∘ a⎻* ) ∘ oA o1 = a⎻* ∘ oA o1);
+ apply (#‡(id_neutral_left2 : ?));]
+qed.
+
+definition Obasic_topology_of_OBTop: objs2 OBTop → Obasic_topology ≝ λx.x.
+coercion Obasic_topology_of_OBTop.
+
+definition Ocontinuous_relation_setoid_of_arrows2_OBTop :
+ ∀P,Q. arrows2 OBTop P Q → Ocontinuous_relation_setoid P Q ≝ λP,Q,x.x.
+coercion Ocontinuous_relation_setoid_of_arrows2_OBTop.
+
+notation > "B ⇒_\obt2 C" right associative with precedence 72 for @{'arrows2_OBT $B $C}.
+notation "B ⇒\sub (\obt 2) C" right associative with precedence 72 for @{'arrows2_OBT $B $C}.
+interpretation "'arrows2_OBT" 'arrows2_OBT A B = (arrows2 OBTop A B).
+
+
+(*
+(*CSC: unused! *)
+(* this proof is more logic-oriented than set/lattice oriented *)
+theorem continuous_relation_eqS:
+ ∀o1,o2:basic_topology.∀a,a': continuous_relation_setoid o1 o2.
+ a = a' → ∀X. A ? (extS ?? a X) = A ? (extS ?? a' X).
+ intros;
+ cut (∀a: arrows1 ? o1 ?.∀x. x ∈ extS ?? a X → ∃y:o2.y ∈ X ∧ x ∈ ext ?? a y);
+ [2: intros; cases f; clear f; cases H1; exists [apply w] cases x1; split;
+ try assumption; split; assumption]
+ cut (∀a,a':continuous_relation_setoid o1 o2.eq1 ? a a' → ∀x. x ∈ extS ?? a X → ∃y:o2. y ∈ X ∧ x ∈ A ? (ext ?? a' y));
+ [2: intros; cases (Hcut ?? f); exists; [apply w] cases x1; split; try assumption;
+ apply (. #‡(H1 ?));
+ apply (saturation_expansive ?? (A_is_saturation o1) (ext ?? a1 w) x);
+ assumption;] clear Hcut;
+ split; apply (if ?? (A_is_saturation ???)); intros 2;
+ [lapply (Hcut1 a a' H a1 f) | lapply (Hcut1 a' a (H \sup -1) a1 f)]
+ cases Hletin; clear Hletin; cases x; clear x;
+ cut (∀a: arrows1 ? o1 ?. ext ?? a w ⊆ extS ?? a X);
+ [2,4: intros 3; cases f3; clear f3; simplify in f5; split; try assumption;
+ exists [1,3: apply w] split; assumption;]
+ cut (∀a. A ? (ext o1 o2 a w) ⊆ A ? (extS o1 o2 a X));
+ [2,4: intros; apply saturation_monotone; try (apply A_is_saturation); apply Hcut;]
+ apply Hcut2; assumption.
+qed.
+*)
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