Proof of Nuprl Lemma : oal_grp

Step * 1 1 1 2 2 2 of Lemma oal_grp_wf2

1. s : LOSet@i'
2. g : OGrp@i'
3. oal_grp(s;g) ∈ AbGrp
4. oal_grp(s;g) ∈ AbMon
5. UniformLinorder(|oal_grp(s;g)|;x,y.↑(x ≤_b y))
∧ (=_b = (λx,y. ((x ≤_b y) ∧_b (y ≤_b x))) ∈ (|oal_grp(s;g)| ⟶ |oal_grp(s;g)| ⟶ 𝔹))
⊢ ∀[z:|oal_grp(s;g)|]. monot(|oal_grp(s;g)|;x,y.↑(x ≤_b y);λw.(z * w))
BY
{ TACTIC:Assert ⌜g ∈ AbDMon⌝⋅ }

1
.....assertion.....
1. s : LOSet@i'
2. g : OGrp@i'
3. oal_grp(s;g) ∈ AbGrp
4. oal_grp(s;g) ∈ AbMon
5. UniformLinorder(|oal_grp(s;g)|;x,y.↑(x ≤_b y))
∧ (=_b = (λx,y. ((x ≤_b y) ∧_b (y ≤_b x))) ∈ (|oal_grp(s;g)| ⟶ |oal_grp(s;g)| ⟶ 𝔹))
⊢ g ∈ AbDMon

2
1. s : LOSet@i'
2. g : OGrp@i'
3. oal_grp(s;g) ∈ AbGrp
4. oal_grp(s;g) ∈ AbMon
5. UniformLinorder(|oal_grp(s;g)|;x,y.↑(x ≤_b y))
∧ (=_b = (λx,y. ((x ≤_b y) ∧_b (y ≤_b x))) ∈ (|oal_grp(s;g)| ⟶ |oal_grp(s;g)| ⟶ 𝔹))
6. g ∈ AbDMon
⊢ ∀[z:|oal_grp(s;g)|]. monot(|oal_grp(s;g)|;x,y.↑(x ≤_b y);λw.(z * w))

Latex:

Latex:
1. s : LOSet@i' 2. g : OGrp@i' 3. oal\_grp(s;g) \mmember{} AbGrp 4. oal\_grp(s;g) \mmember{} AbMon 5. UniformLinorder(|oal\_grp(s;g)|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) \mwedge{} (=\msubb{} = (\mlambda{}x,y. ((x \mleq{}\msubb{} y) \mwedge{}\msubb{} (y \mleq{}\msubb{} x)))) \mvdash{} \mforall{}[z:|oal\_grp(s;g)|]. monot(|oal\_grp(s;g)|;x,y.\muparrow{}(x \mleq{}\msubb{} y);\mlambda{}w.(z * w)) By Latex: TACTIC:Assert \mkleeneopen{}g \mmember{} AbDMon\mkleeneclose{}\mcdot{} Home Index