Proof of Nuprl Lemma : vs-bag-add-add

Step * 1 2 of Lemma vs-bag-add-add

1. K : Rng
2. vs : VectorSpace(K)
3. S : Type
4. f : S ⟶ Point(vs)
5. g : S ⟶ Point(vs)
6. bs : Base
7. b1 : Base
8. bs = b1 ∈ pertype(λas,bs. ((as ∈ S List) ∧ (bs ∈ S List) ∧ permutation(S;as;bs)))
9. bs ∈ S List
10. b1 ∈ S List
11. permutation(S;bs;b1)

12. ∀bs:S List. (Σ{f[b] + g[b] | b ∈ bs} = Σ{f[b] | b ∈ bs} + Σ{g[b] | b ∈ bs} ∈ Point(vs))

⊢ Σ{f[b] + g[b] | b ∈ bs} = Σ{f[b] | b ∈ b1} + Σ{g[b] | b ∈ b1} ∈ Point(vs)
BY
{ ((RWO "-1" 0 THEN Auto) THEN Try ((UsingVars [`S'] (BLemma `vs-bag-add_wf`) THEN Auto))) }

1
1. K : Rng
2. vs : VectorSpace(K)
3. S : Type
4. f : S ⟶ Point(vs)
5. g : S ⟶ Point(vs)
6. bs : Base
7. b1 : Base
8. bs = b1 ∈ pertype(λas,bs. ((as ∈ S List) ∧ (bs ∈ S List) ∧ permutation(S;as;bs)))
9. bs ∈ S List
10. b1 ∈ S List
11. permutation(S;bs;b1)

12. ∀bs:S List. (Σ{f[b] + g[b] | b ∈ bs} = Σ{f[b] | b ∈ bs} + Σ{g[b] | b ∈ bs} ∈ Point(vs))

⊢ Σ{f[b] | b ∈ bs} + Σ{g[b] | b ∈ bs} = Σ{f[b] | b ∈ b1} + Σ{g[b] | b ∈ b1} ∈ Point(vs)

Latex:

Latex:
1. K : Rng 2. vs : VectorSpace(K) 3. S : Type 4. f : S {}\mrightarrow{} Point(vs) 5. g : S {}\mrightarrow{} Point(vs) 6. bs : Base 7. b1 : Base 8. bs = b1 9. bs \mmember{} S List 10. b1 \mmember{} S List 11. permutation(S;bs;b1) 12. \mforall{}bs:S List. (\mSigma{}\{f[b] + g[b] | b \mmember{} bs\} = \mSigma{}\{f[b] | b \mmember{} bs\} + \mSigma{}\{g[b] | b \mmember{} bs\}) \mvdash{} \mSigma{}\{f[b] + g[b] | b \mmember{} bs\} = \mSigma{}\{f[b] | b \mmember{} b1\} + \mSigma{}\{g[b] | b \mmember{} b1\} By Latex: ((RWO "-1" 0 THEN Auto) THEN Try ((UsingVars [`S'] (BLemma `vs-bag-add\_wf`) THEN Auto))) Home Index