FDL - Step of Proof: bool

Step of Proof: bool_sq

12,41

Inference at *
Iof proof for Lemma bool sq:

SQType(

)

by ((RepUnfolds ``sq_type guard`` 0)

CollapseTHEN (UnivCD
THENW (Auto_aux (first_nat 1:n
TH) ((first_nat 1:n),(first_nat 3:n)) (first_tok :t) inil_term)))

TH1:

TH1: 1. x :

TH1: 2. y :

TH1: 3. x = y
TH1:

x ~ y
TH.

Definitions , t T, {T}, P Q, x:A. B(x), SQType(T)

Lemmas bool wf

Definitions	, t T, {T}, P Q, x:A. B(x), SQType(T)
Lemmas	bool wf