On the Reachability Problem for One-Dimensional Thin Grammar Vector Addition Systems
Abstract
Vector addition systems with states (VASS) are a classic model in concurrency theory. Grammar vector addition systems (GVAS), equivalently, pushdown VASS, extend VASS by using a context-free grammar to control addition. In this paper, our main focus is on the reachability problem for one-dimensional thin GVAS (thin 1-GVAS), a structurally restricted yet expressive subclass. By adopting the index measure for complexity, and by generalizing the decomposition technique developed in the study of VASS reachability to grammar-generated derivation trees of GVAS, an effective integer programming system is established for a thin 1-GVAS. In this way, a nondeterministic algorithm with complexity is obtained for the reachability of thin 1-GVAS with index , yielding a tighter upper bound than the previous one.
Cite
@article{arxiv.2602.05315,
title = {On the Reachability Problem for One-Dimensional Thin Grammar Vector Addition Systems},
author = {Chengfeng Xue and Yuxi Fu},
journal= {arXiv preprint arXiv:2602.05315},
year = {2026}
}
Comments
21 pages, 5 figures, submitted to LICS 2026