Proof of Nuprl Lemma : hdf-until-ap

Step * of Lemma hdf-until-ap

∀[A,B,C:Type]. ∀[X:hdataflow(A;B)]. ∀[Y:hdataflow(A;C)]. ∀[a:A].
  (hdf-until(X;Y)(a)
  = <if bag-null(snd(Y(a))) then hdf-until(fst(X(a));fst(Y(a))) else hdf-halt() fi , snd(X(a))>
  ∈ (hdataflow(A;B) × bag(B)))
BY
{ (Auto
   THEN RepUR ``hdf-until hdf-ap`` 0
   THEN RW (AddrC [2] (RecUnfoldC `mk-hdf`)) 0
   THEN Reduce 0
   THEN Fold `hdf-ap` 0
   THEN Repeat (AutoSplit)
   THEN HDataflowHDAll
   THEN Try (Fold `hdf-until` 0)
   THEN (EqCD THEN Auto)
   THEN Try ((Using [`C',⌜C⌝] (BLemma `hdf-until_wf`)⋅ THEN Auto))
   THEN All(\i.RWO "hdf-ap-inl" i THENA Auto)⋅
   THEN Try (OnTwoHyps(\i j. Progress (HypSubst' i j THENA CpltAuto)))
   THEN AllReduce
   THEN Try (((HypSubst (-1) 0 THENA Auto) THEN Reduce 0 THEN Auto))
   THEN AutoSplit) }

Latex:

Latex:
\mforall{}[A,B,C:Type]. \mforall{}[X:hdataflow(A;B)]. \mforall{}[Y:hdataflow(A;C)]. \mforall{}[a:A]. (hdf-until(X;Y)(a) = <if bag-null(snd(Y(a))) then hdf-until(fst(X(a));fst(Y(a))) else hdf-halt() fi , snd(X(a))>) By Latex: (Auto THEN RepUR ``hdf-until hdf-ap`` 0 THEN RW (AddrC [2] (RecUnfoldC `mk-hdf`)) 0 THEN Reduce 0 THEN Fold `hdf-ap` 0 THEN Repeat (AutoSplit) THEN HDataflowHDAll THEN Try (Fold `hdf-until` 0) THEN (EqCD THEN Auto) THEN Try ((Using [`C',\mkleeneopen{}C\mkleeneclose{}] (BLemma `hdf-until\_wf`)\mcdot{} THEN Auto)) THEN All(\mbackslash{}i.RWO "hdf-ap-inl" i THENA Auto)\mcdot{} THEN Try (OnTwoHyps(\mbackslash{}i j. Progress (HypSubst' i j THENA CpltAuto))) THEN AllReduce THEN Try (((HypSubst (-1) 0 THENA Auto) THEN Reduce 0 THEN Auto)) THEN AutoSplit) Home Index