Proof of Nuprl Lemma : l_tree_ind_wf

Step * of Lemma l_tree_ind_wf_simple

∀[L,T,A:Type]. ∀[v:l_tree(L;T)]. ∀[leaf:val:L ⟶ A]. ∀[node:val:T

                                                            ⟶ left_subtree:l_tree(L;T)

                                                            ⟶ right_subtree:l_tree(L;T)

                                                            ⟶ A

                                                            ⟶ A

                                                            ⟶ A].

  (l_tree_ind(v;
              l_tree_leaf(val)⇒ leaf[val];
              l_tree_node(val,left_subtree,right_subtree)⇒ rec1,rec2.node[val;left_subtree;right_subtree;rec1;rec2])
   ∈ A)
BY
{ ProveDatatypeIndWfSimple 2 `l_tree_ind_wf` }

Latex:

Latex:
\mforall{}[L,T,A:Type]. \mforall{}[v:l\_tree(L;T)]. \mforall{}[leaf:val:L {}\mrightarrow{} A]. \mforall{}[node:val:T {}\mrightarrow{} left$_{subtree}$:\000Cl\_tree(L;T) {}\mrightarrow{} right$_{subtree}$\000C:l\_tree(L;T) {}\mrightarrow{} A {}\mrightarrow{} A {}\mrightarrow{} A]. (l\_tree\_ind(v; l\_tree\_leaf(val){}\mRightarrow{} leaf[val]; l\_tree\_node(val,left$_{subtree}$,right$_{subtree}\mbackslash{}\000Cff24){}\mRightarrow{} rec1,rec2.node[val;...;...;rec1;rec2]) \mmember{} A) By Latex: ProveDatatypeIndWfSimple 2 `l\_tree\_ind\_wf` Home Index