Proof of Nuprl Lemma : bind-class-rel

Step * of Lemma bind-class-rel

∀[Info,T,S:Type]. ∀[es:EO+(Info)]. ∀[X:EClass(T)]. ∀[Y:T ─→ EClass(S)]. ∀[e:E]. ∀[v:S].
uiff(v ∈ X >u> Y[u](e);↓∃e':{e':E| e' ≤loc e } . ∃u:T. (u ∈ X(e') ∧ v ∈ Y[u](e)))
BY
{ Auto }

1
1. Info : Type
2. T : Type
3. S : Type
4. es : EO+(Info)
5. X : EClass(T)
6. Y : T ─→ EClass(S)
7. e : E
8. v : S
9. v ∈ X >u> Y[u](e)
⊢ ↓∃e':{e':E| e' ≤loc e } . ∃u:T. (u ∈ X(e') ∧ v ∈ Y[u](e))

2
1. Info : Type
2. T : Type
3. S : Type
4. es : EO+(Info)
5. X : EClass(T)
6. Y : T ─→ EClass(S)
7. e : E
8. v : S
9. ↓∃e':{e':E| e' ≤loc e } . ∃u:T. (u ∈ X(e') ∧ v ∈ Y[u](e))
⊢ v ∈ X >u> Y[u](e)

Latex:

\mforall{}[Info,T,S:Type]. \mforall{}[es:EO+(Info)]. \mforall{}[X:EClass(T)]. \mforall{}[Y:T {}\mrightarrow{} EClass(S)]. \mforall{}[e:E]. \mforall{}[v:S]. uiff(v \mmember{} X >u> Y[u](e);\mdownarrow{}\mexists{}e':\{e':E| e' \mleq{}loc e \} . \mexists{}u:T. (u \mmember{} X(e') \mwedge{} v \mmember{} Y[u](e))) By Auto Home Index