(vl-consteval-usertype-bits typename ss) → (mv ok res)
Function:
(defun vl-consteval-usertype-bits (typename ss) (declare (xargs :guard (and (stringp typename) (vl-scopestack-p ss)))) (let ((__function__ 'vl-consteval-usertype-bits)) (declare (ignorable __function__)) (b* ((usertype (make-vl-usertype :kind (vl-idexpr typename nil nil))) ((mv warning type) (vl-datatype-usertype-elim usertype ss 100)) ((when warning) (mv nil nil)) ((mv warning size) (vl-datatype-size type)) ((when warning) (mv nil nil))) (mv t size))))
Theorem:
(defthm booleanp-of-vl-consteval-usertype-bits.ok (b* (((mv ?ok ?res) (vl-consteval-usertype-bits typename ss))) (booleanp ok)) :rule-classes :type-prescription)
Theorem:
(defthm return-type-of-vl-consteval-usertype-bits.res (b* (((mv ?ok ?res) (vl-consteval-usertype-bits typename ss))) (implies ok (posp res))) :rule-classes :type-prescription)
Theorem:
(defthm vl-consteval-usertype-bits-of-str-fix-typename (equal (vl-consteval-usertype-bits (str-fix typename) ss) (vl-consteval-usertype-bits typename ss)))
Theorem:
(defthm vl-consteval-usertype-bits-streqv-congruence-on-typename (implies (streqv typename typename-equiv) (equal (vl-consteval-usertype-bits typename ss) (vl-consteval-usertype-bits typename-equiv ss))) :rule-classes :congruence)
Theorem:
(defthm vl-consteval-usertype-bits-of-vl-scopestack-fix-ss (equal (vl-consteval-usertype-bits typename (vl-scopestack-fix ss)) (vl-consteval-usertype-bits typename ss)))
Theorem:
(defthm vl-consteval-usertype-bits-vl-scopestack-equiv-congruence-on-ss (implies (vl-scopestack-equiv ss ss-equiv) (equal (vl-consteval-usertype-bits typename ss) (vl-consteval-usertype-bits typename ss-equiv))) :rule-classes :congruence)