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Grammar

Cst-elif-group-conc

Signature
(cst-elif-group-conc abnf::cst) → abnf::cstss
Arguments: abnf::cst — Guard (abnf::treep abnf::cst).
Returns: abnf::cstss — Type (abnf::tree-list-listp abnf::cstss).

Definitions and Theorems

Function: cst-elif-group-conc

(defun cst-elif-group-conc (abnf::cst)
  (declare (xargs :guard (abnf::treep abnf::cst)))
  (declare (xargs :guard (cst-matchp abnf::cst "elif-group")))
  (let ((__function__ 'cst-elif-group-conc))
    (declare (ignorable __function__))
    (abnf::tree-nonleaf->branches abnf::cst)))

Theorem: tree-list-listp-of-cst-elif-group-conc

(defthm tree-list-listp-of-cst-elif-group-conc
  (b* ((abnf::cstss (cst-elif-group-conc abnf::cst)))
    (abnf::tree-list-listp abnf::cstss))
  :rule-classes :rewrite)

Theorem: cst-elif-group-conc-match

(defthm cst-elif-group-conc-match
 (implies
     (cst-matchp abnf::cst "elif-group")
     (b* ((abnf::cstss (cst-elif-group-conc abnf::cst)))
       (cst-list-list-conc-matchp
            abnf::cstss
            "\"#\" %s\"elif\" constant-expression new-line [ group ]")))
 :rule-classes :rewrite)

Theorem: cst-elif-group-conc-of-tree-fix-cst

(defthm cst-elif-group-conc-of-tree-fix-cst
  (equal (cst-elif-group-conc (abnf::tree-fix abnf::cst))
         (cst-elif-group-conc abnf::cst)))

Theorem: cst-elif-group-conc-tree-equiv-congruence-on-cst

(defthm cst-elif-group-conc-tree-equiv-congruence-on-cst
  (implies (abnf::tree-equiv abnf::cst cst-equiv)
           (equal (cst-elif-group-conc abnf::cst)
                  (cst-elif-group-conc cst-equiv)))
  :rule-classes :congruence)