Proof of Nuprl Lemma : hdf-sqequal2

Step * of Lemma hdf-sqequal2

∀[F,G,H:Top].

  (fix((λmk-hdf,s0. case s0 of inl(y) => inl (λa.let X',bs = y a in let out ⟵ G[bs] in <mk-hdf X', out>) | inr(z) => H[\000Cz]))

fix((λmk-hdf.(inl (λm.<mk-hdf, F[m]>)))) ~ fix((λmk-hdf.(inl (λa.let out ⟵ G[F[a]]

                                                                    in <mk-hdf, out>)))))

BY
{ (Auto
   THEN SqequalInductionUsing' UnrollLoopsOnce⋅
   THEN Auto
   THEN SqequalNNonCanonicalCD⋅
   THEN Try (Complete (Auto))
   THEN SqequalNCanonicalCD⋅
   THEN Auto
   THEN BackThruSomeHyp⋅
   THEN Auto) }

Latex:

Latex:
\mforall{}[F,G,H:Top]. (fix((\mlambda{}mk-hdf,s0. case s0 of inl(y) => inl (\mlambda{}a.let X',bs = y a in let out \mleftarrow{}{} G[bs] in <mk-hdf X', out>) | inr(z) => H[z])) fix((\mlambda{}mk-hdf.(inl (\mlambda{}m.<mk-hdf, F[m]>)))) \msim{} fix((\mlambda{}mk-hdf.(inl (\mlambda{}a.let out \mleftarrow{}{} G[F[a]] in <mk-hdf, out>))))) By Latex: (Auto THEN SqequalInductionUsing' UnrollLoopsOnce\mcdot{} THEN Auto THEN SqequalNNonCanonicalCD\mcdot{} THEN Try (Complete (Auto)) THEN SqequalNCanonicalCD\mcdot{} THEN Auto THEN BackThruSomeHyp\mcdot{} THEN Auto) Home Index