include "sets/sets.ma".
-nrecord magma (A: Type) : Type[1] ≝
+nrecord pre_magma : Type[1] ≝
+ { carr: Type;
+ op: carr → carr → carr
+ }.
+(* this is a projection *)
+ndefinition carr: pre_magma → Type
+ ≝ λM: pre_magma. match M with [ mk_pre_magma carr _ ⇒ carr ].
+ncoercion carr: ∀M:pre_magma. Type ≝ carr on _M: pre_magma to Type.
+ndefinition op ≝
+ λM: pre_magma. match M return λM:pre_magma. M → M → M with [ mk_pre_magma _ op ⇒ op ].
+
+nrecord magma (A: pre_magma) : Type[1] ≝
{ mcarr: Ω \sup A;
- op: A → A → A;
- op_closed: ∀x,y. x ∈ mcarr → y ∈ mcarr → op x y ∈ mcarr
+ op_closed: ∀x,y. x ∈ mcarr → y ∈ mcarr → op A x y ∈ mcarr
}.
(* this is a projection *)
-ndefinition mcarr ≝ λA.λM: magma A. match M with [ mk_magma mcarr _ _ ⇒ mcarr ].
-ndefinition op ≝ λA.λM: magma A. match M with [ mk_magma _ op _ ⇒ op ].
+ndefinition mcarr ≝ λA.λM: magma A. match M with [ mk_magma mcarr _ ⇒ mcarr ].
+ncoercion mcarr: ∀A.∀M: magma A. Ω \sup A ≝ mcarr
+ on _M: magma ? to Ω \sup ?.
+ndefinition op_closed ≝
+ λA.λM: magma A.
+ match M return λM: magma A.∀x,y. x ∈ M → y ∈ M → op ? x y ∈ M with
+ [ mk_magma _ opc ⇒ opc ].
-(* to be splitted *)
-nrecord magma_morphism (A,B: Type) (Ma: magma A) (Mb: magma B) : Type ≝
+nrecord pre_magma_morphism (A,B: pre_magma) : Type ≝
{ mmcarr: A → B;
- mmclosed: ∀x. x ∈ mcarr ? Ma → mmcarr x ∈ mcarr ? Mb;
- (* need a canonical structure in next line? *)
- mmprop: ∀x,y:A. x ∈ mcarr ? Ma → y ∈ mcarr ? Ma → mmcarr (op ? Ma x y) = op B Mb (mmcarr x) (mmcarr y)
+ mmprop: ∀x,y. mmcarr (op ? x y) = op ? (mmcarr x) (mmcarr y)
}.
(* this is a projection *)
ndefinition mmcarr ≝
- λA,B,Ma,Mb.λf: magma_morphism A B Ma Mb. match f with [ mk_magma_morphism f _ _ ⇒ f ].
+ λA,B.λf: pre_magma_morphism A B. match f with [ mk_pre_magma_morphism f _ ⇒ f ].
+ncoercion mmcarr: ∀A,B.∀M: pre_magma_morphism A B. A → B ≝ mmcarr
+ on _M: pre_magma_morphism ? ? to ∀_.?.
+
+nrecord magma_morphism (A) (B) (Ma: magma A) (Mb: magma B) : Type ≝
+ { mmmcarr: pre_magma_morphism A B;
+ mmclosed: ∀x. x ∈ Ma → mmmcarr x ∈ Mb
+ }.
+(* this is a projection *)
+ndefinition mmmcarr ≝
+ λA,B,Ma,Mb.λf: magma_morphism A B Ma Mb. match f with [ mk_magma_morphism f _ ⇒ f ].
+ncoercion mmmcarr : ∀A,B,Ma,Mb.∀f: magma_morphism A B Ma Mb. pre_magma_morphism A B
+ ≝ mmmcarr
+ on _f: magma_morphism ???? to pre_magma_morphism ??.
+ndefinition mmclosed ≝
+ λA,B,Ma,Mb.λf: magma_morphism A B Ma Mb.
+ match f return λf: magma_morphism A B Ma Mb.∀x. x ∈ Ma → f x ∈ Mb with
+ [ mk_magma_morphism _ p ⇒ p ].
ndefinition sub_magma ≝
- λA.λM1,M2: magma A. ∀x. x ∈ mcarr ? M1 → x ∈ mcarr ? M2.
+ λA.λM1,M2: magma A. M1 ⊆ M2.
ndefinition image: ∀A,B. (A → B) → Ω \sup A → Ω \sup B ≝
λA,B,f,Sa. {y | ∃x. x ∈ Sa ∧ f x = y}.
ndefinition mm_image:
∀A,B. ∀Ma: magma A. ∀Mb: magma B. magma_morphism ?? Ma Mb → magma B.
#A; #B; #Ma; #Mb; #f;
- napply (mk_magma ????)
- [ napply (image ?? (mmcarr ???? f) (mcarr ? Ma))
- | napply (op ? Mb)
- | #x; #y; *; #x0; #Hx0; *; #y0; #Hy0; nwhd;
+ napply (mk_magma ???)
+ [ napply (image ?? (mmcarr ?? (mmmcarr ???? f)) (mcarr ? Ma))
+ | #x; #y; nwhd in ⊢ (% → % → ?); *; #x0; *; #Hx0; #Hx1; *; #y0; *; #Hy0; #Hy1; nwhd;
napply (ex_intro ????)
- [ napply (op ? Ma x0 y0) (* BAD HERE! need a canonical structure? *)
- | nelim daemon ]]
+ [ napply (op ? x0 y0)
+ | napply (conj ????)
+ [ napply (op_closed ??????); nassumption
+ | nelim daemon ]##]
nqed.
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