Proof of Nuprl Lemma : omral_alg_umap_is

Step * 1 1 1 3 of Lemma omral_alg_umap_is_hom

1. g : OCMon
2. g ∈ DMon
3. a : CDRng
4. n : algebra{i:l}(a)
5. f : MonHom(g,n↓rg↓xmn)
6. a1 : |omral(g;a)|
7. a2 : |omral(g;a)|
8. k : |(g↓oset)|
9. ↑(k
∈_b (dom(a1) ⋃ dom(a2)) - dom(a1))
⊢ ((a1[k]) n.act (f k)) = 0 ∈ |n↓rg|
BY
{ ((RWW "lookup_omral_eq_zero module_act_zero_l" 0
THENM Reduce 0) THEN Auto) }

1
.....rewrite subgoal.....
1. g : OCMon
2. g ∈ DMon
3. a : CDRng
4. n : algebra{i:l}(a)
5. f : MonHom(g,n↓rg↓xmn)
6. a1 : |omral(g;a)|
7. a2 : |omral(g;a)|
8. k : |(g↓oset)|
9. ↑(k
∈_b (dom(a1) ⋃ dom(a2)) - dom(a1))
⊢ ¬↑(k
∈_b dom(a1))

Latex:

Latex:
1. g : OCMon 2. g \mmember{} DMon 3. a : CDRng 4. n : algebra\{i:l\}(a) 5. f : MonHom(g,n\mdownarrow{}rg\mdownarrow{}xmn) 6. a1 : |omral(g;a)| 7. a2 : |omral(g;a)| 8. k : |(g\mdownarrow{}oset)| 9. \muparrow{}(k \mmember{}\msubb{} (dom(a1) \mcup{} dom(a2)) - dom(a1)) \mvdash{} ((a1[k]) n.act (f k)) = 0 By Latex: ((RWW "lookup\_omral\_eq\_zero module\_act\_zero\_l" 0 THENM Reduce 0) THEN Auto) Home Index