Proof of Nuprl Lemma : rec-class-val

Step * 1 of Lemma rec-class-val

1. Info : Type@i'
2. T : Type@i'
3. G : es:EO+(Info) ⟶ E ⟶ bag(T)@i'
4. F : es:EO+(Info) ⟶ e':E ⟶ T ⟶ {e:E| (e' <loc e)}  ⟶ bag(T)@i'
5. es : EO+(Info)@i'
6. e : E@i
7. X : EClass(T)@i'
⊢ only(if (#(prior(X) es e) =_z 1) then F[es;prior(X)(e);X(prior(X)(e));e] else G[es;e] fi )
  = if (#(prior(X) es e) =_z 1) then only(F[es;prior(X)(e);X(prior(X)(e));e]) else only(G[es;e]) fi
  ∈ T

  supposing ↑(#(if (#(prior(X) es e) =_z 1) then F[es;prior(X)(e);X(prior(X)(e));e] else G[es;e] fi ) =_z 1)

BY
{ ((GenConcl ⌜(prior(X) es e) = B ∈ bag(E(X))⌝⋅

    THENA (Auto THEN (InstLemma `es-prior-interface_wf` [⌜Info⌝;⌜X⌝]⋅ THENA Auto) THEN Unfold `eclass` -1 THEN Auto)

    )
   THEN Try ((AutoSplit THEN RepUR ``let`` 0))
   )⋅ }

1
1. Info : Type@i'
2. T : Type@i'
3. G : es:EO+(Info) ⟶ E ⟶ bag(T)@i'
4. F : es:EO+(Info) ⟶ e':E ⟶ T ⟶ {e:E| (e' <loc e)}  ⟶ bag(T)@i'
5. es : EO+(Info)@i'
6. e : E@i
7. X : EClass(T)@i'
8. B : bag(E(X))@i
9. (prior(X) es e) = B ∈ bag(E(X))@i
10. #(B) = 1 ∈ ℤ
⊢ only(F[es;prior(X)(e);X(prior(X)(e));e]) = only(F[es;prior(X)(e);X(prior(X)(e));e]) ∈ T
  supposing ↑(#(F[es;prior(X)(e);X(prior(X)(e));e]) =_z 1)

2
1. Info : Type@i'
2. T : Type@i'
3. G : es:EO+(Info) ⟶ E ⟶ bag(T)@i'
4. F : es:EO+(Info) ⟶ e':E ⟶ T ⟶ {e:E| (e' <loc e)}  ⟶ bag(T)@i'
5. es : EO+(Info)@i'
6. e : E@i
7. X : EClass(T)@i'
8. B : bag(E(X))@i
9. #(B) ≠ 1
10. (prior(X) es e) = B ∈ bag(E(X))@i
⊢ only(G[es;e]) = only(G[es;e]) ∈ T supposing ↑(#(G[es;e]) =_z 1)

Latex:

Latex:
1. Info : Type@i' 2. T : Type@i' 3. G : es:EO+(Info) {}\mrightarrow{} E {}\mrightarrow{} bag(T)@i' 4. F : es:EO+(Info) {}\mrightarrow{} e':E {}\mrightarrow{} T {}\mrightarrow{} \{e:E| (e' <loc e)\} {}\mrightarrow{} bag(T)@i' 5. es : EO+(Info)@i' 6. e : E@i 7. X : EClass(T)@i' \mvdash{} only(if (\#(prior(X) es e) =\msubz{} 1) then F[es;prior(X)(e);X(prior(X)(e));e] else G[es;e] fi ) = if (\#(prior(X) es e) =\msubz{} 1) then only(F[es;prior(X)(e);X(prior(X)(e));e]) else only(G[es;e]) fi supposing \muparrow{}(\#(if (\#(prior(X) es e) =\msubz{} 1) then F[es;prior(X)(e);X(prior(X)(e));e] else G[es;e] fi ) =\msubz{} 1) By Latex: ((GenConcl \mkleeneopen{}(prior(X) es e) = B\mkleeneclose{}\mcdot{} THENA (Auto THEN (InstLemma `es-prior-interface\_wf` [\mkleeneopen{}Info\mkleeneclose{};\mkleeneopen{}X\mkleeneclose{}]\mcdot{} THENA Auto) THEN Unfold `eclass` -1 THEN Auto) ) THEN Try ((AutoSplit THEN RepUR ``let`` 0)) )\mcdot{} Home Index