Proof of Nuprl Lemma : monoid_hom

Step * 1 1 of Lemma monoid_hom_op

1. g : GrpSig
2. h : GrpSig
3. f : MonHom(g,h)
4. FunThru2op(|g|;|h|;*;*;f)
5. (f e) = e ∈ |h|
6. u : |g|
7. v : |g|
⊢ (f (u * v)) = ((f u) * (f v)) ∈ |h|
BY
{ UnfoldTopAb 4 THEN ((HypBackchain) THEN Auto) }

Latex:

Latex:
1. g : GrpSig 2. h : GrpSig 3. f : MonHom(g,h) 4. FunThru2op(|g|;|h|;*;*;f) 5. (f e) = e 6. u : |g| 7. v : |g| \mvdash{} (f (u * v)) = ((f u) * (f v)) By Latex: UnfoldTopAb 4 THEN ((HypBackchain) THEN Auto) Home Index