Publication details

On Pure Multi-Pushdown Automata that Perform Complete Pushdown Pops

Authors

MASOPUST Tomáš MEDUNA Alexander

Year of publication 2009
Type Article in Periodical
Magazine / Source Acta Cybernetica
MU Faculty or unit

Faculty of Informatics

Citation
Field Informatics
Keywords Pure multi-pushdown automaton, complete pushdown pop, infinite hierarchy.
Description This paper introduces and discusses pure multi-pushdown automata that remove symbols from their pushdowns only by performing complete pushdown pops. This means that during a pop operation, the entire pushdown is compared with a prefix of the input, and if they match, the whole contents of the pushdown is erased and the input is advanced by the prefix. The paper proves that these automata define an infinite hierarchy of language families identical with the infinite hierarchy of language families resulting from right linear simple matrix grammars. In addition, this paper discusses some other extensions of these automata with respect to operations they can perform with their pushdowns. More specifically, it discusses pure multi-pushdown automata that perform complete pushdown pops that are allowed to join two pushdowns and/or create a new pushdown.

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