Final sentential forms

• https://arxiv.org/abs/2309.08719v1

sentential form, Turing power, recursively enumerable language, propagating context-free grammar, palindromial language, queue grammar

Let G be a context-free grammar with a total alphabet V, and let F be a final language over an alphabet W as a subset of V. A final sentential form is any sentential form of G that, after omitting symbols from V-W, it belongs to F. The string resulting from the elimination of all nonterminals from W in a final sentential form is in the language of G finalized by F if and only if it contains only terminals. The language of any context-free grammar finalized by a regular language is context-free. On the other hand, it is demonstrated that L is a recursively enumerable language if and only if there exists a propagating context-free grammar G such that L equals the language of G finalized by {w#rev(w):string w over alphabet {0,1}}, where rev(w) is the reversal of w.