Proof of Nuprl Lemma : rng_mssum_of

Step * of Lemma rng_mssum_of_plus

∀r:Rng. ∀s:DSet. ∀e,f:|s| ⟶ |r|. ∀a:MSet{s}.  ((Σx ∈ a. (e[x] +r f[x])) = ((Σx ∈ a. e[x]) +r (Σx ∈ a. f[x])) ∈ |r|)

{ ProveSpecializedLemma `mset_for_of_op` 1 [parm{i};r↓+gp] (FoldsC ``rng_when rng_mssum`` ANDTHENC AbReduceC) }

Latex:

Latex:
\mforall{}r:Rng. \mforall{}s:DSet. \mforall{}e,f:|s| {}\mrightarrow{} |r|. \mforall{}a:MSet\{s\}. ((\mSigma{}x \mmember{} a. (e[x] +r f[x])) = ((\mSigma{}x \mmember{} a. e[x]) +r (\mSigma{}x \mmember{} a. f[x]))) By Latex: ProveSpecializedLemma `mset\_for\_of\_op` 1 [parm\{i\};r\mdownarrow{}+gp ] (FoldsC ``rng\_when rng\_mssum`` ANDTHENC AbReduceC) Home Index