Proof of Nuprl Lemma : binary_map_ind

Step * of Lemma binary_map_ind_wf

∀[T,Key,A:Type]. ∀[R:A ⟶ binary_map(T;Key) ⟶ ℙ]. ∀[v:binary_map(T;Key)]. ∀[E:{x:A| R[x;bm_E()]} ].

∀[T:key:Key
    ⟶ value:T
    ⟶ cnt:ℤ
    ⟶ left:binary_map(T;Key)
    ⟶ right:binary_map(T;Key)
    ⟶ {x:A| R[x;left]}
    ⟶ {x:A| R[x;right]}
    ⟶ {x:A| R[x;bm_T(key;value;cnt;left;right)]} ].

  (binary_map_ind(v;E;key,value,cnt,left,right,rec1,rec2.T[key;value;cnt;left;right;rec1;rec2]) ∈ {x:A| R[x;v]} )

BY
{ ProveDatatypeIndWf TERMOF{binary_map-definition:o, 1:l, i:l}⋅ }

Latex:

Latex:
\mforall{}[T,Key,A:Type]. \mforall{}[R:A {}\mrightarrow{} binary\_map(T;Key) {}\mrightarrow{} \mBbbP{}]. \mforall{}[v:binary\_map(T;Key)]. \mforall{}[E:\{x:A| R[x;bm\_E()]\} ]. \mforall{}[T:key:Key {}\mrightarrow{} value:T {}\mrightarrow{} cnt:\mBbbZ{} {}\mrightarrow{} left:binary\_map(T;Key) {}\mrightarrow{} right:binary\_map(T;Key) {}\mrightarrow{} \{x:A| R[x;left]\} {}\mrightarrow{} \{x:A| R[x;right]\} {}\mrightarrow{} \{x:A| R[x;bm\_T(key;value;cnt;left;right)]\} ]. (binary\_map\_ind(v;E;key,value,cnt,left,right,rec1,rec2.T[key;value;cnt;left;right;rec1;rec2]) \mmember{} \{x:A| R[x;v]\} ) By Latex: ProveDatatypeIndWf TERMOF\{binary\_map-definition:o, 1:l, i:l\}\mcdot{} Home Index