Proof of Nuprl Lemma : presheaf-subset

Step * 2 1 1 1 of Lemma presheaf-subset_wf

1. C : SmallCategory
2. F : Presheaf(C)
3. P : I:cat-ob(C) ⟶ (ob(F) I) ⟶ ℙ
4. stable-element-predicate(C;F;I,rho.P[I;rho])
5. I : cat-ob(C)
6. J : cat-ob(C)
7. K : cat-ob(C)
8. f : cat-arrow(C) J I
9. g : cat-arrow(C) K J
10. rho : ob(F) I
11. P[I;rho]
12. ∀[f:cat-arrow(C) J I]. ∀[g:cat-arrow(C) K J].
      ((arrow(F) I K (cat-comp(C) K J I g f))
      = (cat-comp(TypeCat) (ob(F) I) (ob(F) J) (ob(F) K) (arrow(F) I J f) (arrow(F) J K g))
      ∈ (cat-arrow(TypeCat) (ob(F) I) (ob(F) K)))

13. (arrow(F) I K (cat-comp(C) K J I g f)) = ((arrow(F) J K g) o (arrow(F) I J f)) ∈ ((ob(F) I) ⟶ (ob(F) K))

⊢ (arrow(F) I K (cat-comp(C) K J I g f) rho) = (arrow(F) J K g (arrow(F) I J f rho)) ∈ (ob(F) K)

BY
{ (ApFunToHypEquands `Z' ⌜Z rho⌝ ⌜ob(F) K⌝ (-1)⋅ THEN Auto) }

Latex:

Latex:
1. C : SmallCategory 2. F : Presheaf(C) 3. P : I:cat-ob(C) {}\mrightarrow{} (ob(F) I) {}\mrightarrow{} \mBbbP{} 4. stable-element-predicate(C;F;I,rho.P[I;rho]) 5. I : cat-ob(C) 6. J : cat-ob(C) 7. K : cat-ob(C) 8. f : cat-arrow(C) J I 9. g : cat-arrow(C) K J 10. rho : ob(F) I 11. P[I;rho] 12. \mforall{}[f:cat-arrow(C) J I]. \mforall{}[g:cat-arrow(C) K J]. ((arrow(F) I K (cat-comp(C) K J I g f)) = (cat-comp(TypeCat) (ob(F) I) (ob(F) J) (ob(F) K) (arrow(F) I J f) (arrow(F) J K g))) 13. (arrow(F) I K (cat-comp(C) K J I g f)) = ((arrow(F) J K g) o (arrow(F) I J f)) \mvdash{} (arrow(F) I K (cat-comp(C) K J I g f) rho) = (arrow(F) J K g (arrow(F) I J f rho)) By Latex: (ApFunToHypEquands `Z' \mkleeneopen{}Z rho\mkleeneclose{} \mkleeneopen{}ob(F) K\mkleeneclose{} (-1)\mcdot{} THEN Auto) Home Index