Proof of Nuprl Lemma : oal_umap

Step * 1 2 of Lemma oal_umap_char

1. s : LOSet
2. g : AbDMon
3. h : AbMon
4. f : |s| ⟶ MonHom(g,h)
5. ∀k:|s|. IsMonHom{g,h}(f k)
⊢ (λps:|oal(s;g)|. msFor{h} k ∈ dom(ps)
(f k (ps[k]))) = !v:|oal(s;g)| ⟶ |h|
(IsMonHom{oal_mon(s;g),h}(v)

                                        ∧ (∀j:|s|. ((f j) = (v o (λw.inj(j,w))) ∈ (|g| ⟶ |h|))))

BY
{ Eval ``monoid_hom_p fun_thru_2op`` 5 }

1
1. s : LOSet
2. g : AbDMon
3. h : AbMon
4. f : |s| ⟶ MonHom(g,h)

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

⊢ (λps:|oal(s;g)|. msFor{h} k ∈ dom(ps)
(f k (ps[k]))) = !v:|oal(s;g)| ⟶ |h|
(IsMonHom{oal_mon(s;g),h}(v)

                                        ∧ (∀j:|s|. ((f j) = (v o (λw.inj(j,w))) ∈ (|g| ⟶ |h|))))

Latex:

Latex:
1. s : LOSet 2. g : AbDMon 3. h : AbMon 4. f : |s| {}\mrightarrow{} MonHom(g,h) 5. \mforall{}k:|s|. IsMonHom\{g,h\}(f k) \mvdash{} (\mlambda{}ps:|oal(s;g)|. msFor\{h\} k \mmember{} dom(ps) (f k (ps[k]))) = !v:|oal(s;g)| {}\mrightarrow{} |h| (IsMonHom\{oal\_mon(s;g),h\}(v) \mwedge{} (\mforall{}j:|s|. ((f j) = (v o (\mlambda{}w.inj(j,w)))))) By Latex: Eval ``monoid\_hom\_p fun\_thru\_2op`` 5 Home Index