Proof of Nuprl Lemma : zhgrp_op_mon_hom

Step * 1 1 of Lemma zhgrp_op_mon_hom_1

1. g : IMonoid
2. a : |g|
3. IsMonHom{<ℕ,+>,g}(λn.(n ⋅ a))
⊢ IsMonHom{<ℤ+>↓hgrp,g}(λn.(nat(n) ⋅ a))
BY
{ AssertLemma `zhgrp_to_nat_is_hom` [] }

1
1. g : IMonoid
2. a : |g|
3. IsMonHom{<ℕ,+>,g}(λn.(n ⋅ a))
4. IsMonHom{<ℤ+>↓hgrp,<ℕ,+>}(λn.nat(n))
⊢ IsMonHom{<ℤ+>↓hgrp,g}(λn.(nat(n) ⋅ a))

Latex:

Latex:
1. g : IMonoid 2. a : |g| 3. IsMonHom\{<\mBbbN{},+>,g\}(\mlambda{}n.(n \mcdot{} a)) \mvdash{} IsMonHom\{<\mBbbZ{}+>\mdownarrow{}hgrp,g\}(\mlambda{}n.(nat(n) \mcdot{} a)) By Latex: AssertLemma `zhgrp\_to\_nat\_is\_hom` [] Home Index