Reachability in Dynamical Systems with Rounding
Abstract
We consider reachability in dynamical systems with discrete linear updates, but with fixed digital precision, i.e., such that values of the system are rounded at each step. Given a matrix , an initial vector , a granularity and a rounding operation projecting a vector of onto another vector whose every entry is a multiple of , we are interested in the behaviour of the orbit , i.e., the trajectory of a linear dynamical system in which the state is rounded after each step. For arbitrary rounding functions with bounded effect, we show that the complexity of deciding point-to-point reachability---whether a given target belongs to ---is PSPACE-complete for hyperbolic systems (when no eigenvalue of has modulus one). We also establish decidability without any restrictions on eigenvalues for several natural classes of rounding functions.
Keywords
Cite
@article{arxiv.2009.13353,
title = {Reachability in Dynamical Systems with Rounding},
author = {Christel Baier and Florian Funke and Simon Jantsch and Toghrul Karimov and Engel Lefaucheux and Joël Ouaknine and Amaury Pouly and David Purser and Markus A. Whiteland},
journal= {arXiv preprint arXiv:2009.13353},
year = {2020}
}
Comments
To appear at FSTTCS'20