The Pseudo-Reachability Problem for Diagonalisable Linear Dynamical Systems
Logic in Computer Science
2022-07-07 v3
Abstract
We study fundamental reachability problems on pseudo-orbits of linear dynamical systems. Pseudo-orbits can be viewed as a model of computation with limited precision and pseudo-reachability can be thought of as a robust version of classical reachability. Using an approach based on -minimality of we prove decidability of the discrete-time pseudo-reachability problem with arbitrary semialgebraic targets for diagonalisable linear dynamical systems. We also show that our method can be used to reduce the continuous-time pseudo-reachability problem to the (classical) time-bounded reachability problem, which is known to be conditionally decidable.
Cite
@article{arxiv.2204.12253,
title = {The Pseudo-Reachability Problem for Diagonalisable Linear Dynamical Systems},
author = {Julian D'Costa and Toghrul Karimov and Rupak Majumdar and Joël Ouaknine and Mahmoud Salamati and James Worrell},
journal= {arXiv preprint arXiv:2204.12253},
year = {2022}
}