Reachability of vector addition systems with states (VASS) is Ackermann complete~\cite{leroux2021reachability,czerwinski2021reachability}. For d-dimensional VASS reachability it is known that the problem is NP-complete~\cite{HaaseKreutzerOuaknineWorrell2009} when d=1, PSPACE-complete~\cite{BlondinFinkelGoellerHaaseMcKenzie2015} when d=2, and in Fd~\cite{FuYangZheng2024} when d>2. A geometrically d-dimensional VASS is a D-dimensional VASS for some D≥d such that the space spanned by the displacements of the circular paths admitted in the D-dimensional VASS is d-dimensional. It is proved that the Fd upper bounds remain valid for the reachability problem in the geometrically d-dimensional VASSes with d>2.
Cite
@article{arxiv.2504.12302,
title = {Reachability in Geometrically $d$-Dimensional VASS},
author = {Yuxi Fu and Yangluo Zheng and Qizhe Yang},
journal= {arXiv preprint arXiv:2504.12302},
year = {2025}
}