On the Polytope Escape Problem for Continuous Linear Dynamical Systems
Computational Complexity
2017-02-14 v2
Abstract
The Polyhedral Escape Problem for continuous linear dynamical systems consists of deciding, given an affine function and a convex polyhedron , whether, for some initial point in , the trajectory of the unique solution to the differential equation , , is entirely contained in . We show that this problem is decidable, by reducing it in polynomial time to the decision version of linear programming with real algebraic coefficients, thus placing it in , which lies between NP and PSPACE. Our algorithm makes use of spectral techniques and relies among others on tools from Diophantine approximation.
Cite
@article{arxiv.1507.03166,
title = {On the Polytope Escape Problem for Continuous Linear Dynamical Systems},
author = {Joël Ouaknine and João Sousa-Pinto and James Worrell},
journal= {arXiv preprint arXiv:1507.03166},
year = {2017}
}
Comments
Accepted to HSCC 2017