Context-Free Commutative Grammars with Integer Counters and Resets
Formal Languages and Automata Theory
2016-06-27 v2
Abstract
We study the computational complexity of reachability, coverability and inclusion for extensions of context-free commutative grammars with integer counters and reset operations on them. Those grammars can alternatively be viewed as an extension of communication-free Petri nets. Our main results are that reachability and coverability are inter-reducible and both NP-complete. In particular, this class of commutative grammars enjoys semi-linear reachability sets. We also show that the inclusion problem is, in general, coNEXP-complete and already -complete for grammars with only one non-terminal symbol. Showing the lower bound for the latter result requires us to develop a novel -complete variant of the classic subset sum problem.
Cite
@article{arxiv.1511.04893,
title = {Context-Free Commutative Grammars with Integer Counters and Resets},
author = {Dmitry Chistikov and Christoph Haase and Simon Halfon},
journal= {arXiv preprint arXiv:1511.04893},
year = {2016}
}
Comments
33 pages