Proof of Nuprl Lemma : monad-of-Kleisli-adjunction

Step * 1 2 1 1 of Lemma monad-of-Kleisli-adjunction

1. C : SmallCategory
2. M : Monad(C)
3. x : cat-ob(C)
4. y : cat-ob(C)
5. f : cat-arrow(C) x y

⊢ (cat-comp(C) M(x) M(M(y)) M(y) (arrow(monad-functor(M)) x M(y) (cat-comp(C) x y M(y) f monad-unit(M;y)))

monad-op(M;y))
= (arrow(monad-functor(M)) x y f)
∈ (cat-arrow(C) M(x) M(y))
BY
{ ((RWO "functor-arrow-comp" 0 THENA Auto) THEN Fold `monad-fun` 0) }

1
1. C : SmallCategory
2. M : Monad(C)
3. x : cat-ob(C)
4. y : cat-ob(C)
5. f : cat-arrow(C) x y
⊢ (cat-comp(C) M(x) M(M(y)) M(y)

   (cat-comp(C) M(x) M(y) M(M(y)) (arrow(monad-functor(M)) x y f) (arrow(monad-functor(M)) y M(y) monad-unit(M;y)))

monad-op(M;y))
= (arrow(monad-functor(M)) x y f)
∈ (cat-arrow(C) M(x) M(y))

Latex:

Latex:
1. C : SmallCategory 2. M : Monad(C) 3. x : cat-ob(C) 4. y : cat-ob(C) 5. f : cat-arrow(C) x y \mvdash{} (cat-comp(C) M(x) M(M(y)) M(y) (arrow(monad-functor(M)) x M(y) (cat-comp(C) x y M(y) f monad-unit(M;y))) monad-op(M;y)) = (arrow(monad-functor(M)) x y f) By Latex: ((RWO "functor-arrow-comp" 0 THENA Auto) THEN Fold `monad-fun` 0) Home Index