Proof of Nuprl Lemma : adjunction-monad

Step * 2 1 1 of Lemma adjunction-monad_wf

1. A : SmallCategory
2. B : SmallCategory
3. F : Functor(A;B)
4. G : Functor(B;A)
5. a1 : nat-trans(B;B;functor-comp(G;F);1)
6. a2 : nat-trans(A;A;1;functor-comp(F;G))
7. ∀d:cat-ob(A)
     ((cat-comp(B) (F d) (F (G (F d))) (F d) (F d (G (F d)) (a2 d)) (a1 (F d)))
     = (cat-id(B) (F d))
     ∈ (cat-arrow(B) (F d) (F d)))
8. ∀c:cat-ob(B)
     ((cat-comp(A) (G c) (G (F (G c))) (G c) (a2 (G c)) (G (F (G c)) c (a1 c)))
     = (cat-id(A) (G c))
     ∈ (cat-arrow(A) (G c) (G c)))
9. X : cat-ob(A)@i
⊢ (cat-comp(A) (G (F (G (F (G (F X)))))) (G (F (G (F X)))) (G (F X))
   (G (F (G (F (G (F X))))) (F (G (F X))) (a1 (F (G (F X)))))
   (G (F (G (F X))) (F X) (a1 (F X))))
= (cat-comp(A) (G (F (G (F (G (F X)))))) (G (F (G (F X)))) (G (F X))

   (G (F (G (F (G (F X))))) (F (G (F X))) (F (G (F (G (F X)))) (G (F X)) (G (F (G (F X))) (F X) (a1 (F X)))))

   (G (F (G (F X))) (F X) (a1 (F X))))
∈ (cat-arrow(A) (G (F (G (F (G (F X)))))) (G (F X)))
BY
{ ((DVar `a2' THEN DVar `a1') THEN All (RepUR ``functor-comp id_functor``)) }

1
1. A : SmallCategory
2. B : SmallCategory
3. F : Functor(A;B)
4. G : Functor(B;A)
5. a1 : A:cat-ob(B) ⟶ (cat-arrow(B) (F (G A)) A)
6. ∀A,B@0:cat-ob(B). ∀g:cat-arrow(B) A B@0.
     ((cat-comp(B) (F (G A)) A B@0 (a1 A) g)
     = (cat-comp(B) (F (G A)) (F (G B@0)) B@0 (F (G A) (G B@0) (G A B@0 g)) (a1 B@0))
     ∈ (cat-arrow(B) (F (G A)) B@0))
7. a2 : A@0:cat-ob(A) ⟶ (cat-arrow(A) A@0 (G (F A@0)))
8. ∀A@0,B:cat-ob(A). ∀g:cat-arrow(A) A@0 B.
     ((cat-comp(A) A@0 (G (F A@0)) (G (F B)) (a2 A@0) (G (F A@0) (F B) (F A@0 B g)))
     = (cat-comp(A) A@0 B (G (F B)) g (a2 B))
     ∈ (cat-arrow(A) A@0 (G (F B))))
9. ∀d:cat-ob(A)
     ((cat-comp(B) (F d) (F (G (F d))) (F d) (F d (G (F d)) (a2 d)) (a1 (F d)))
     = (cat-id(B) (F d))
     ∈ (cat-arrow(B) (F d) (F d)))
10. ∀c:cat-ob(B)
      ((cat-comp(A) (G c) (G (F (G c))) (G c) (a2 (G c)) (G (F (G c)) c (a1 c)))
      = (cat-id(A) (G c))
      ∈ (cat-arrow(A) (G c) (G c)))
11. X : cat-ob(A)@i
⊢ (cat-comp(A) (G (F (G (F (G (F X)))))) (G (F (G (F X)))) (G (F X))
   (G (F (G (F (G (F X))))) (F (G (F X))) (a1 (F (G (F X)))))
   (G (F (G (F X))) (F X) (a1 (F X))))
= (cat-comp(A) (G (F (G (F (G (F X)))))) (G (F (G (F X)))) (G (F X))

   (G (F (G (F (G (F X))))) (F (G (F X))) (F (G (F (G (F X)))) (G (F X)) (G (F (G (F X))) (F X) (a1 (F X)))))

(G (F (G (F X))) (F X) (a1 (F X))))
∈ (cat-arrow(A) (G (F (G (F (G (F X)))))) (G (F X)))

Latex:

Latex:
1. A : SmallCategory 2. B : SmallCategory 3. F : Functor(A;B) 4. G : Functor(B;A) 5. a1 : nat-trans(B;B;functor-comp(G;F);1) 6. a2 : nat-trans(A;A;1;functor-comp(F;G)) 7. \mforall{}d:cat-ob(A) ((cat-comp(B) (F d) (F (G (F d))) (F d) (F d (G (F d)) (a2 d)) (a1 (F d))) = (cat-id(B) (F d))) 8. \mforall{}c:cat-ob(B) ((cat-comp(A) (G c) (G (F (G c))) (G c) (a2 (G c)) (G (F (G c)) c (a1 c))) = (cat-id(A) (G c))) 9. X : cat-ob(A)@i \mvdash{} (cat-comp(A) (G (F (G (F (G (F X)))))) (G (F (G (F X)))) (G (F X)) (G (F (G (F (G (F X))))) (F (G (F X))) (a1 (F (G (F X))))) (G (F (G (F X))) (F X) (a1 (F X)))) = (cat-comp(A) (G (F (G (F (G (F X)))))) (G (F (G (F X)))) (G (F X)) (G (F (G (F (G (F X))))) (F (G (F X))) (F (G (F (G (F X)))) (G (F X)) (G (F (G (F X))) (F X) (a1 (F X))))) (G (F (G (F X))) (F X) (a1 (F X)))) By Latex: ((DVar `a2' THEN DVar `a1') THEN All (RepUR ``functor-comp id\_functor``)) Home Index