(* ----------------------------------------------------- *) ⊢
carr1 R ≡ ext_powerclass A.
-
+interpretation "prop21 mem" 'prop2 l r = (prop21 (setoid1_of_setoid ?) (ext_powerclass_setoid ?) ? ? ???? l r).
+
(*
ncoercion ext_carr' : ∀A.∀x:ext_powerclass_setoid A. Ω^A ≝ ext_carr
on _x : (carr1 (ext_powerclass_setoid ?)) to (Ω^?).
TT ≟ (mk_binary_morphism1 ???
(λx:setoid1_of_setoid ?.λS:ext_powerclass_setoid ?. x ∈ S)
(prop21 ??? (mem_ext_powerclass_setoid_is_morph A))),
- M1 ≟ ?,
- M2 ≟ ?,
- M3 ≟ ?
+ XX ≟ (ext_powerclass_setoid A)
(*-------------------------------------*) ⊢
- fun21 M1 M2 M3 TT x S ≡ mem A SS x.
+ fun21 (setoid1_of_setoid A) XX CPROP TT x S
+ ≡ mem A SS x.
nlemma subseteq_is_morph: ∀A. binary_morphism1 (ext_powerclass_setoid A) (ext_powerclass_setoid A) CPROP.
#A; @
nlemma intersect_is_ext: ∀A. 𝛀^A → 𝛀^A → 𝛀^A.
#A; #S; #S'; @ (S ∩ S');
- #a; #a'; #Ha; @; *; #H1; #H2; @
+ #a; #a'; #Ha; @; *; #H1; #H2; @
[##1,2: napply (. Ha^-1‡#); nassumption;
##|##3,4: napply (. Ha‡#); nassumption]
nqed.
fun21 (powerclass_setoid A) (powerclass_setoid A) (powerclass_setoid A) R B C
≡ intersect ? B C.
-ndefinition prop21_mem :
- ∀A,C.∀f:binary_morphism1 (setoid1_of_setoid A) (ext_powerclass_setoid A) C.
- ∀a,a':setoid1_of_setoid A.
- ∀b,b':ext_powerclass_setoid A.a = a' → b = b' → f a b = f a' b'.
-#A; #C; #f; #a; #a'; #b; #b'; #H1; #H2; napply prop21; nassumption;
-nqed.
-
-interpretation "prop21 mem" 'prop2 l r = (prop21_mem ??????? l r).
+interpretation "prop21 ext" 'prop2 l r = (prop21 (ext_powerclass_setoid ?) (ext_powerclass_setoid ?) ? ? ???? l r).
nlemma intersect_is_ext_morph:
∀A. binary_morphism1 (ext_powerclass_setoid A) (ext_powerclass_setoid A) (ext_powerclass_setoid A).
intersect (carr A) BB CC.
(*
+alias symbol "hint_decl" = "hint_decl_Type2".
+unification hint 0 ≔
+ A : setoid, B,C : 𝛀^A ;
+ CC ≟ (ext_carr ? C),
+ BB ≟ (ext_carr ? B),
+ C1 ≟ (carr1 (powerclass_setoid (carr A))),
+ C2 ≟ (carr1 (ext_powerclass_setoid A))
+ ⊢
+ eq_rel1 C1 (eq1 (powerclass_setoid (carr A))) BB CC ≡
+ eq_rel1 C2 (eq1 (ext_powerclass_setoid A)) B C.
+
+unification hint 0 ≔
+ A, B : CPROP ⊢ iff A B ≡ eq_rel1 ? (eq1 CPROP) A B.
-
-nlemma test: ∀U.∀A,B:qpowerclass U. A ∩ B = A →
+nlemma test: ∀U.∀A,B:𝛀^U. A ∩ B = A →
∀x,y. x=y → x ∈ A → y ∈ A ∩ B.
- #U; #A; #B; #H; #x; #y; #K; #K2; napply (. #‡(?));
-##[ nchange with (A ∩ B = ?);
- napply (prop21 ??? (mk_binary_morphism1 … (λS,S'.S ∩ S') (prop21 … (intersect_ok' U))) A A B B ##);
- #H; napply H;
+ #U; #A; #B; #H; #x; #y; #K; #K2;
+ alias symbol "prop2" = "prop21 mem".
+ alias symbol "invert" = "setoid1 symmetry".
+ napply (. K^-1‡H);
nassumption;
nqed.
-(*
-nlemma intersect_ok: ∀A. binary_morphism1 (qpowerclass_setoid A) (qpowerclass_setoid A) (qpowerclass_setoid A).
+
+nlemma intersect_ok: ∀A. binary_morphism1 (ext_powerclass_setoid A) (ext_powerclass_setoid A) (ext_powerclass_setoid A).
#A; @
[ #S; #S'; @
[ napply (S ∩ S')
##|##3,4: napply (. Ha‡#); nassumption]##]
##| #a; #a'; #b; #b'; #Ha; #Hb; nwhd; @; #x; nwhd in ⊢ (% → %); #H
[ alias symbol "invert" = "setoid1 symmetry".
- napply (. ((#‡Ha^-1)‡(#‡Hb^-1))); nassumption
+ alias symbol "refl" = "refl".
+alias symbol "prop2" = "prop21".
+napply (. ((#‡Ha^-1)‡(#‡Hb^-1))); nassumption
| napply (. ((#‡Ha)‡(#‡Hb))); nassumption ]##]
nqed.
(* unfold if intersect, exposing fun21 *)
alias symbol "hint_decl" = "hint_decl_Type1".
unification hint 0 ≔
- A : setoid, B,C : qpowerclass A ⊢
+ A : setoid, B,C : ext_powerclass A ⊢
pc A (fun21 …
(mk_binary_morphism1 …
(λS,S':qpowerclass_setoid A.mk_qpowerclass ? (S ∩ S') (mem_ok' ? (intersect_ok ? S S')))
#A; #B; #f; #x; napply refl;
nqed.
+alias symbol "eq" = "setoid eq".
ndefinition surjective ≝
- λA,B.λS: qpowerclass A.λT: qpowerclass B.λf:unary_morphism A B.
+ λA,B.λS: ext_powerclass A.λT: ext_powerclass B.λf:unary_morphism A B.
∀y. y ∈ T → ∃x. x ∈ S ∧ f x = y.
ndefinition injective ≝
- λA,B.λS: qpowerclass A.λf:unary_morphism A B.
+ λA,B.λS: ext_powerclass A.λf:unary_morphism A B.
∀x,x'. x ∈ S → x' ∈ S → f x = f x' → x = x'.
nlemma first_omomorphism_theorem_functions2:
#A; #B; #f; nwhd; #x; #x'; #Hx; #Hx'; #K; nassumption.
nqed.
-nrecord isomorphism (A, B : setoid) (S: qpowerclass A) (T: qpowerclass B) : Type[0] ≝
+nrecord isomorphism (A, B : setoid) (S: ext_powerclass A) (T: ext_powerclass B) : Type[0] ≝
{ iso_f:> unary_morphism A B;
f_closed: ∀x. x ∈ S → iso_f x ∈ T;
f_sur: surjective … S T iso_f;
f_inj: injective … S iso_f
}.
+nlemma subseteq_intersection_l: ∀A.∀U,V,W:Ω^A.U ⊆ W ∨ V ⊆ W → U ∩ V ⊆ W.
+#A; #U; #V; #W; *; #H; #x; *; #xU; #xV; napply H; nassumption;
+nqed.
+
+nlemma subseteq_union_l: ∀A.∀U,V,W:Ω^A.U ⊆ W → V ⊆ W → U ∪ V ⊆ W.
+#A; #U; #V; #W; #H; #H1; #x; *; #Hx; ##[ napply H; ##| napply H1; ##] nassumption;
+nqed.
+
+nlemma subseteq_intersection_r: ∀A.∀U,V,W:Ω^A.W ⊆ U → W ⊆ V → W ⊆ U ∩ V.
+#A; #U; #V; #W; #H1; #H2; #x; #Hx; @; ##[ napply H1; ##| napply H2; ##] nassumption;
+nqed.
+
(*
nrecord isomorphism (A, B : setoid) (S: qpowerclass A) (T: qpowerclass B) : CProp[0] ≝
{ iso_f:> unary_morphism A B;
;
}.
*)
-*)
\ No newline at end of file
projects / helm.git / blobdiff