Proof of Nuprl Lemma : mset_for_dom

Step * 1 1 1 of Lemma mset_for_dom_shift

1. s : DSet
2. g : IAbMonoid
3. f : |s| ⟶ |g|
4. p : MSet{s}
5. q : MSet{s}
6. ↑(p ⊆_b q)
7. ∀x:|s|. ((↑(x ∈_b q - p)) ⇒ (f[x] = e ∈ |g|))
⊢ (msFor{g} x ∈ p. f[x]) = ((msFor{g} x ∈ q - p. f[x]) * (msFor{g} x ∈ p. f[x])) ∈ |g|
BY
{ ((RWN 2 (HypC 7) 0
THENM RWH (LemmaC `mset_for_of_id`) 0
THENM RW MonNormC 0) THEN Auto) }

Latex:

Latex:
1. s : DSet 2. g : IAbMonoid 3. f : |s| {}\mrightarrow{} |g| 4. p : MSet\{s\} 5. q : MSet\{s\} 6. \muparrow{}(p \msubseteq{}\msubb{} q) 7. \mforall{}x:|s|. ((\muparrow{}(x \mmember{}\msubb{} q - p)) {}\mRightarrow{} (f[x] = e)) \mvdash{} (msFor\{g\} x \mmember{} p. f[x]) = ((msFor\{g\} x \mmember{} q - p. f[x]) * (msFor\{g\} x \mmember{} p. f[x])) By Latex: ((RWN 2 (HypC 7) 0 THENM RWH (LemmaC `mset\_for\_of\_id`) 0 THENM RW MonNormC 0) THEN Auto) Home Index