Step
*
of Lemma
RankEx2-induction
∀[S,T:Type]. ∀[P:RankEx2(S;T) ⟶ ℙ].
((∀leaft:T. P[RankEx2_LeafT(leaft)])
⇒ (∀leafs:S. P[RankEx2_LeafS(leafs)])
⇒ (∀prod:RankEx2(S;T) × S × T. (let u,u1 = prod in let u1,u2 = u in P[u1] ⇒ P[RankEx2_Prod(prod)]))
⇒ (∀union:S × RankEx2(S;T) + RankEx2(S;T)
(case union of inl(u) => let u1,u2 = u in P[u2] | inr(u1) => P[u1] ⇒ P[RankEx2_Union(union)]))
⇒ (∀listprod:(S × RankEx2(S;T)) List. ((∀u∈listprod.let u1,u2 = u in P[u2]) ⇒ P[RankEx2_ListProd(listprod)]))
⇒ (∀unionlist:T + (RankEx2(S;T) List)
(case unionlist of inl(u) => True | inr(u1) => (∀u∈u1.P[u]) ⇒ P[RankEx2_UnionList(unionlist)]))
⇒ {∀v:RankEx2(S;T). P[v]})
BY
{ ProveDatatypeInd }
Latex:
Latex:
\mforall{}[S,T:Type]. \mforall{}[P:RankEx2(S;T) {}\mrightarrow{} \mBbbP{}].
((\mforall{}leaft:T. P[RankEx2\_LeafT(leaft)])
{}\mRightarrow{} (\mforall{}leafs:S. P[RankEx2\_LeafS(leafs)])
{}\mRightarrow{} (\mforall{}prod:RankEx2(S;T) \mtimes{} S \mtimes{} T
(let u,u1 = prod in let u1,u2 = u in P[u1] {}\mRightarrow{} P[RankEx2\_Prod(prod)]))
{}\mRightarrow{} (\mforall{}union:S \mtimes{} RankEx2(S;T) + RankEx2(S;T)
(case union of inl(u) => let u1,u2 = u in P[u2] | inr(u1) => P[u1]
{}\mRightarrow{} P[RankEx2\_Union(union)]))
{}\mRightarrow{} (\mforall{}listprod:(S \mtimes{} RankEx2(S;T)) List
((\mforall{}u\mmember{}listprod.let u1,u2 = u in P[u2]) {}\mRightarrow{} P[RankEx2\_ListProd(listprod)]))
{}\mRightarrow{} (\mforall{}unionlist:T + (RankEx2(S;T) List)
(case unionlist of inl(u) => True | inr(u1) => (\mforall{}u\mmember{}u1.P[u])
{}\mRightarrow{} P[RankEx2\_UnionList(unionlist)]))
{}\mRightarrow{} \{\mforall{}v:RankEx2(S;T). P[v]\})
By
Latex:
ProveDatatypeInd
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