X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Fcontribs%2Fformal_topology%2Foverlap%2Fo-formal_topologies.ma;h=e750dcc900f62e67a2773af66796401d5570022a;hb=df018fb5614e932492d30f7388883d532b70709a;hp=e136821af74f5a5c025ce0923e9f39deb3116880;hpb=3d7b244a79a1c57d3355deb2f9a70764cde077b9;p=helm.git diff --git a/helm/software/matita/contribs/formal_topology/overlap/o-formal_topologies.ma b/helm/software/matita/contribs/formal_topology/overlap/o-formal_topologies.ma index e136821af..e750dcc90 100644 --- a/helm/software/matita/contribs/formal_topology/overlap/o-formal_topologies.ma +++ b/helm/software/matita/contribs/formal_topology/overlap/o-formal_topologies.ma @@ -14,14 +14,7 @@ include "o-basic_topologies.ma". -definition btop_carr: BTop → Type ≝ λo:BTop. carr1 (oa_P (carrbt o)). -coercion btop_carr. - (* -definition btop_carr': BTop → setoid1 ≝ λo:BTop. carrbt o. - -coercion btop_carr'. - definition downarrow: ∀S:BTop. unary_morphism (Ω \sup S) (Ω \sup S). intros; constructor 1; [ apply (λU:Ω \sup S.{a | ∃b:carrbt S. b ∈ U ∧ a ∈ A ? (singleton ? b)}); @@ -48,9 +41,6 @@ record formal_topology: Type ≝ }. (* -definition bt': formal_topology → basic_topology ≝ λo:formal_topology.bt o. - -coercion bt'. definition ffintersects': ∀S:BTop. binary_morphism1 S S (Ω \sup S). intros; constructor 1; @@ -66,11 +56,6 @@ record formal_map (S,T: formal_topology) : Type ≝ C2: extS ?? cr T = S }. -definition cr': ∀FT1,FT2.formal_map FT1 FT2 → continuous_relation FT1 FT2 ≝ - λFT1,FT2,c. cr FT1 FT2 c. - -coercion cr'. - definition formal_map_setoid: formal_topology → formal_topology → setoid1. intros (S T); constructor 1; [ apply (formal_map S T); @@ -81,16 +66,6 @@ definition formal_map_setoid: formal_topology → formal_topology → setoid1. | simplify; intros 3; apply trans1]] qed. -definition cr'': ∀FT1,FT2.formal_map_setoid FT1 FT2 → arrows1 BTop FT1 FT2 ≝ - λFT1,FT2,c.cr ?? c. - -coercion cr''. - -definition cr''': ∀FT1,FT2.formal_map_setoid FT1 FT2 → arrows1 REL FT1 FT2 ≝ - λFT1,FT2:formal_topology.λc:formal_map_setoid FT1 FT2.cont_rel FT1 FT2 (cr' ?? c). - -coercion cr'''. - axiom C1': ∀S,T: formal_topology.∀f:formal_map_setoid S T.∀U,V: Ω \sup T. extS ?? f (U ↓ V) = extS ?? f U ↓ extS ?? f V.