Proof of Nuprl Lemma : State-comb-fun-eq2

Step * of Lemma State-comb-fun-eq2

∀[Info,B,A:Type]. ∀[f:A ⟶ B ⟶ B]. ∀[init:Id ⟶ bag(B)]. ∀[X:EClass(A)]. ∀[es:EO+(Info)]. ∀[e:E].

(State-comb(init;f;X)(e)

     = if e ∈_b X then if first(e) then f X@e sv-bag-only(init loc(e)) else f X@e State-comb(init;f;X)(pred(e)) fi

       if first(e) then sv-bag-only(init loc(e))
       else State-comb(init;f;X)(pred(e))
       fi
     ∈ B) supposing
     (single-valued-classrel(es;X;A) and
     (∀l:Id. single-valued-bag(init l;B)) and
     (∀l:Id. (1 ≤ #(init l))))
BY
{ (Auto THEN RepUR ``classfun-res`` 0 THEN BLemma `State-comb-fun-eq` THEN Auto) }

Latex:

Latex:
\mforall{}[Info,B,A:Type]. \mforall{}[f:A {}\mrightarrow{} B {}\mrightarrow{} B]. \mforall{}[init:Id {}\mrightarrow{} bag(B)]. \mforall{}[X:EClass(A)]. \mforall{}[es:EO+(Info)]. \mforall{}[e:E]. (State-comb(init;f;X)(e) = if e \mmember{}\msubb{} X then if first(e) then f X@e sv-bag-only(init loc(e)) else f X@e State-comb(init;f;X)(pred(e)) fi if first(e) then sv-bag-only(init loc(e)) else State-comb(init;f;X)(pred(e)) fi ) supposing (single-valued-classrel(es;X;A) and (\mforall{}l:Id. single-valued-bag(init l;B)) and (\mforall{}l:Id. (1 \mleq{} \#(init l)))) By Latex: (Auto THEN RepUR ``classfun-res`` 0 THEN BLemma `State-comb-fun-eq` THEN Auto) Home Index