Publication details

On language inequalities XK ⊆ LX

Authors

KUNC Michal

Year of publication 2005
Type Article in Proceedings
Conference Developments in Language Theory: 9th International Conference, DLT 2005, Palermo, Italy, July 4-8, 2005. Proceedings
MU Faculty or unit

Faculty of Science

Citation
web http://www.springerlink.com/link.asp?id=qdg18xkthkj0rn0g
Field General mathematics
Keywords Language inequality; Regular language; Recursively enumerable language; Minsky machine
Description It is known that for a regular language L and an arbitrary language K the largest solution of the inequality XK subset LX is regular. Here we show that there exist finite languages K and P and star-free languages L, M and R such that the largest solutions of the systems {XK subset LX, X subset M} and {XK subset LX, XP subset RX} are not recursively enumerable.
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