FDL - Step of Proof: bor_ff

Step of Proof: bor_ff_simp

9,38

Inference at *
Iof proof for Lemma bor ff simp:

. (u

ff) = u

by ((((UnivCD)

CollapseTHENM (BoolEval))

)

CollapseTHEN ((Auto_aux (first_nat 1:n

C) ((first_nat 1:n),(first_nat 3:n)) (first_tok :t) inil_term)))

Definitions t T, tt, if b then t else f fi , ff, p q, x:A. B(x), Unit, ,

Lemmas bool wf, bfalse wf, btrue wf

Definitions	t T, tt, if b then t else f fi , ff, p q, x:A. B(x), Unit, ,
Lemmas	bool wf, bfalse wf, btrue wf