Proof of Nuprl Lemma : MultiTree_ind_wf

Step * of Lemma MultiTree_ind_wf_simple

∀[T,A:Type]. ∀[v:MultiTree(T)]. ∀[Node:labels:{L:Atom List| 0 < ||L||}

                                       ⟶ children:({a:Atom| (a ∈ labels)}  ⟶ MultiTree(T))

                                       ⟶ (u:{a:Atom| (a ∈ labels)}  ⟶ A)

                                       ⟶ A]. ∀[Leaf:val:T ⟶ A].
  (MultiTree_ind(v;
                 MTree_Node(labels,children)⇒ rec1.Node[labels;children;rec1];
                 MTree_Leaf(val)⇒ Leaf[val])  ∈ A)
BY
{ ProveDatatypeIndWfSimple 1 `MultiTree_ind_wf` }

Latex:

Latex:
\mforall{}[T,A:Type]. \mforall{}[v:MultiTree(T)]. \mforall{}[Node:labels:\{L:Atom List| 0 < ||L||\} {}\mrightarrow{} children:(\{a:Atom| (a \mmember{} labels)\} {}\mrightarrow{} MultiTree(T)) {}\mrightarrow{} (u:\{a:Atom| (a \mmember{} labels)\} {}\mrightarrow{} A) {}\mrightarrow{} A]. \mforall{}[Leaf:val:T {}\mrightarrow{} A]. (MultiTree\_ind(v; MTree\_Node(labels,children){}\mRightarrow{} rec1.Node[labels;children;rec1]; MTree\_Leaf(val){}\mRightarrow{} Leaf[val]) \mmember{} A) By Latex: ProveDatatypeIndWfSimple 1 `MultiTree\_ind\_wf` Home Index