Proof of Nuprl Lemma : oal_grp

Step * of Lemma oal_grp_wf1

∀s:LOSet. ∀g:OGrp.  (oal_grp(s;g) ∈ OMon)
BY
{ (Intros
   THEN (InstLemma `ocgrp_abdgrp` [⌜g⌝]⋅ THENA Auto)
   THEN (Assert g ∈ AbDMon BY

               (MemTypeCD THEN Try (BLemma `omon_inc`) THEN Auto THEN RepeatFor 3 (DVar `g') THEN Auto))

   THEN (Assert UniformLinorder(|oal_grp(s;g)|;x,y.↑(x ≤_b y)) BY
               (Force `5` (Reduce 0) THEN Fold `oal_le` 0⋅
                THEN (((Unfold `ulinorder` 0
                      THEN Backchain ``oal_le_connex``) THEN Auto)
                      THEN Try ((BLemma `ocgrp_abdgrp` THEN Auto))
                      THEN ((InstLemma `oal_le_is_order` [⌜s⌝;⌜g⌝]⋅ THEN Auto)

                            THEN (((D 0 THEN D -1) THEN Auto THEN D 0 THEN Auto) THEN BLemma `ocgrp_abdgrp` THEN Auto)⋅

)⋅)⋅
))) }

1
1. s : LOSet
2. g : OGrp
3. g ∈ AbDGrp
4. g ∈ AbDMon
5. UniformLinorder(|oal_grp(s;g)|;x,y.↑(x ≤_b y))
⊢ oal_grp(s;g) ∈ OMon

Latex:

Latex:
\mforall{}s:LOSet. \mforall{}g:OGrp. (oal\_grp(s;g) \mmember{} OMon) By Latex: (Intros THEN (InstLemma `ocgrp\_abdgrp` [\mkleeneopen{}g\mkleeneclose{}]\mcdot{} THENA Auto) THEN (Assert g \mmember{} AbDMon BY (MemTypeCD THEN Try (BLemma `omon\_inc`) THEN Auto THEN RepeatFor 3 (DVar `g') THEN Auto)) THEN (Assert UniformLinorder(|oal\_grp(s;g)|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) BY (Force `5` (Reduce 0) THEN Fold `oal\_le` 0\mcdot{} THEN (((Unfold `ulinorder` 0 THEN Backchain ``oal\_le\_connex``) THEN Auto) THEN Try ((BLemma `ocgrp\_abdgrp` THEN Auto)) THEN ((InstLemma `oal\_le\_is\_order` [\mkleeneopen{}s\mkleeneclose{};\mkleeneopen{}g\mkleeneclose{}]\mcdot{} THEN Auto) THEN (((D 0 THEN D -1) THEN Auto THEN D 0 THEN Auto) THEN BLemma `ocgrp\_abdgrp` THEN Auto)\mcdot{} )\mcdot{})\mcdot{} ))) Home Index