FDL - Step of Proof: assert_of_eq

Step of Proof: assert_of_eq_int

9,38

Inference at * 1 1 2
Iof proof for Lemma assert of eq int:

1. x :

2. y :

if x=y then tt else ff
4.

(x = y)

x = y

by ((RWH (ReduceThenC (Auto_aux (first_nat 1:n) ((first_nat 1:n),(first_nat 4:n)) (first_tok :t

) inil_term)) 3)

CollapseTHENA ((Auto_aux (first_nat 1:n) ((first_nat 1:n),(first_nat 3:n

C)) (first_tok :t) inil_term)))

C1:

C1: 3.

C1: 4.

(x = y)

C1:

x = y

Definitions P Q, P Q, t T, True, T, , P Q, P Q, False, x:A. B(x), A

Lemmas bfalse wf, bool wf, true wf, squash wf, assert wf

Definitions	P Q, P Q, t T, True, T, , P Q, P Q, False, x:A. B(x), A
Lemmas	bfalse wf, bool wf, true wf, squash wf, assert wf