Proof of Nuprl Lemma : omral

Step * 2 1 1 5 of Lemma omral_bilinear

1. g : OCMon
2. a : CDRng
3. ps : |omral(g;a)|
4. qs : |omral(g;a)|
5. rs : |omral(g;a)|
6. u : |g|
7. x : |(g↓oset)|
8. ↑(x
∈_b dom(ps))
9. x@0 : |(g↓oset)|
10. ↑(x@0
∈_b (dom(qs) ⋃ dom(rs)) - dom(rs))
⊢ (when (x * x@0) =_b u. ((ps[x]) * (rs[x@0]))) = e ∈ |a↓+gp|
BY
{ ((RWH (LemmaC `mset_mem_diff`) 10
THENM RW bool_to_propC 10
THENM Reduce 0
THENM RWN 2 (LemmaC `lookup_omral_eq_zero`) 0
THENM RW RngNormC 0
THENM RWH (LemmaC `rng_when_of_zero`) 0) THEN Auto) }

Latex:

Latex:
1. g : OCMon 2. a : CDRng 3. ps : |omral(g;a)| 4. qs : |omral(g;a)| 5. rs : |omral(g;a)| 6. u : |g| 7. x : |(g\mdownarrow{}oset)| 8. \muparrow{}(x \mmember{}\msubb{} dom(ps)) 9. x@0 : |(g\mdownarrow{}oset)| 10. \muparrow{}(x@0 \mmember{}\msubb{} (dom(qs) \mcup{} dom(rs)) - dom(rs)) \mvdash{} (when (x * x@0) =\msubb{} u. ((ps[x]) * (rs[x@0]))) = e By Latex: ((RWH (LemmaC `mset\_mem\_diff`) 10 THENM RW bool\_to\_propC 10 THENM Reduce 0 THENM RWN 2 (LemmaC `lookup\_omral\_eq\_zero`) 0 THENM RW RngNormC 0 THENM RWH (LemmaC `rng\_when\_of\_zero`) 0) THEN Auto) Home Index