Reachability Analysis of Linear System
Abstract
In this paper, we propose a decision procedure of reachability for linear system {\xi}' = A{\xi} + u, where the matrix A's eigenvalues can be arbitrary algebraic numbers and the input u is a vector of trigonometric-exponential polynomials. If the initial set contains only one point, the reachability problem under consideration is resorted to the decidability of the sign of trigonometric-exponential polynomial and then achieved by being reduced to verification of a series of univariate polynomial inequalities through Taylor expansions of the related exponential functions and trigonometric functions. If the initial set is open semi-algebraic, we will propose a decision procedure based on openCAD and an algorithm of real roots isolation derivated from the sign-deciding procedure for the trigonometric-exponential polynomials. The experimental results indicate the efficiency of our approach. Furthermore, the above procedures are complete under the assumption of Schanuel Conjecture
Cite
@article{arxiv.2204.00230,
title = {Reachability Analysis of Linear System},
author = {Shiping Chen and Xinyu Ge},
journal= {arXiv preprint arXiv:2204.00230},
year = {2022}
}