Proof of Nuprl Lemma : fabmon_of_nat_mcp

Step * of Lemma fabmon_of_nat_mcp_wf

∀s:DSet. ∀m:MCopower(s;<ℤ+>↓hgrp).  (fabmon_of_nat_mcp(m) ∈ FAbMon(s))
BY
{ ((Unfold `fabmon_of_nat_mcp` 0
THEN RepD
THENM BLemma `mk_fabmon`
THENM GenRepD) THENA Auto) }

1
1. s : DSet
2. m : MCopower(s;<ℤ+>↓hgrp)
3. g' : AbMon
4. f : |s| ⟶ |g'|
⊢ IsMonHom{m.mon,g'}((λm',f. (m.umap m' (λz,n. (nat(n) ⋅ (f z))))) g' f)

2
1. s : DSet
2. m : MCopower(s;<ℤ+>↓hgrp)
3. g' : AbMon
4. f : |s| ⟶ |g'|

⊢ (((λm',f. (m.umap m' (λz,n. (nat(n) ⋅ (f z))))) g' f) o (λu.(m.inj u zhgrp(1)))) = f ∈ (|s| ⟶ |g'|)

3
1. s : DSet
2. m : MCopower(s;<ℤ+>↓hgrp)
3. g' : AbMon
4. f : |s| ⟶ |g'|
5. u : |m.mon| ⟶ |g'|
6. IsMonHom{m.mon,g'}(u)
7. (u o (λu.(m.inj u zhgrp(1)))) = f ∈ (|s| ⟶ |g'|)
⊢ u = ((λm',f. (m.umap m' (λz,n. (nat(n) ⋅ (f z))))) g' f) ∈ (|m.mon| ⟶ |g'|)

Latex:

Latex:
\mforall{}s:DSet. \mforall{}m:MCopower(s;<\mBbbZ{}+>\mdownarrow{}hgrp). (fabmon\_of\_nat\_mcp(m) \mmember{} FAbMon(s)) By Latex: ((Unfold `fabmon\_of\_nat\_mcp` 0 THEN RepD THENM BLemma `mk\_fabmon` THENM GenRepD) THENA Auto) Home Index