Proof of Nuprl Lemma : monoid_hom

Step * of Lemma monoid_hom_properties

∀[g,h:GrpSig]. ∀[f:MonHom(g,h)]. IsMonHom{g,h}(f)
BY
{ RepUnfolds ``monoid_hom monoid_hom_p fun_thru_2op`` 0 }

1

∀[g,h:GrpSig]. ∀[f:{f:|g| ⟶ |h|| (∀[a1,a2:|g|].  ((f (a1 * a2)) = ((f a1) * (f a2)) ∈ |h|)) ∧ ((f e) = e ∈ |h|)} ].

((∀[a1,a2:|g|]. ((f (a1 * a2)) = ((f a1) * (f a2)) ∈ |h|)) ∧ ((f e) = e ∈ |h|))

Latex:

Latex:
\mforall{}[g,h:GrpSig]. \mforall{}[f:MonHom(g,h)]. IsMonHom\{g,h\}(f) By Latex: RepUnfolds ``monoid\_hom monoid\_hom\_p fun\_thru\_2op`` 0 Home Index