Proof of Nuprl Lemma : omral_times

Step * of Lemma omral_times_dom

∀g:OCMon. ∀r:CDRng. ∀ps,qs:|omral(g;r)|. (↑(dom(ps ** qs) ⊆_b (dom(ps) × dom(qs))))
BY
{ (((RepD) THENA Auto)
THEN (Assert (r↓+gp ∈ AbDMon) ∧ (g ∈ DMon) BY

               ((InstLemma `cdrng_is_abdmonoid` [⌜r⌝]⋅ THEN Auto) THEN BLemma `omon_inc`⋅ THEN Auto))

) }

1
1. g : OCMon
2. r : CDRng
3. ps : |omral(g;r)|
4. qs : |omral(g;r)|
5. (r↓+gp ∈ AbDMon) ∧ (g ∈ DMon)
⊢ ↑(dom(ps ** qs) ⊆_b (dom(ps) × dom(qs)))

Latex:

Latex:
\mforall{}g:OCMon. \mforall{}r:CDRng. \mforall{}ps,qs:|omral(g;r)|. (\muparrow{}(dom(ps ** qs) \msubseteq{}\msubb{} (dom(ps) \mtimes{} dom(qs)))) By Latex: (((RepD) THENA Auto) THEN (Assert (r\mdownarrow{}+gp \mmember{} AbDMon) \mwedge{} (g \mmember{} DMon) BY ((InstLemma `cdrng\_is\_abdmonoid` [\mkleeneopen{}r\mkleeneclose{}]\mcdot{} THEN Auto) THEN BLemma `omon\_inc`\mcdot{} THEN Auto)) ) Home Index