Proof of Nuprl Lemma : concat-map-decide

Step * 2 1 of Lemma concat-map-decide

1. T : Type
2. B : T ⟶ (Top + Top)
3. u : T
4. v : T List
5. concat(map(λx.case B[x] of inl(a) => [a] | inr(a) => [];v)) ~ mapfilter(λx.outl(B[x]);λx.isl(B[x]);v)
6. x1 : Top
7. B[u] = (inl x1) ∈ (Top + Top)
8. True

⊢ concat([[x1] / map(λx.case B[x] of inl(a) => [a] | inr(a) => [];v)]) ~ [x1 / mapfilter(λx.outl(B[x]);λx.isl(B[x]);v)]

BY
{ xxx(Unfold `concat` 0 THEN Reduce 0 THEN Fold `concat` 0 THEN EqCD THEN Try (Trivial))xxx }

Latex:

Latex:
1. T : Type 2. B : T {}\mrightarrow{} (Top + Top) 3. u : T 4. v : T List 5. concat(map(\mlambda{}x.case B[x] of inl(a) => [a] | inr(a) => [];v)) \msim{} mapfilter(\mlambda{}x.outl(B[x]); \mlambda{}x.isl(B[x]); v) 6. x1 : Top 7. B[u] = (inl x1) 8. True \mvdash{} concat([[x1] / map(\mlambda{}x.case B[x] of inl(a) => [a] | inr(a) => [];v)]) \msim{} [x1 / mapfilter(\mlambda{}x.outl(B[x]); \mlambda{}x.isl(B[x]); v)] By Latex: xxx(Unfold `concat` 0 THEN Reduce 0 THEN Fold `concat` 0 THEN EqCD THEN Try (Trivial))xxx Home Index