Data-Driven Reachability Analysis with Christoffel Functions
Abstract
We present an algorithm for data-driven reachability analysis that estimates finite-horizon forward reachable sets for general nonlinear systems using level sets of a certain class of polynomials known as Christoffel functions. The level sets of Christoffel functions are known empirically to provide good approximations to the support of probability distributions: the algorithm uses this property for reachability analysis by solving a probabilistic relaxation of the reachable set computation problem. We also provide a guarantee that the output of the algorithm is an accurate reachable set approximation in a probabilistic sense, provided that a certain sample size is attained. We also investigate three numerical examples to demonstrate the algorithm's capabilities, such as providing non-convex reachable set approximations and detecting holes in the reachable set.
Cite
@article{arxiv.2104.13902,
title = {Data-Driven Reachability Analysis with Christoffel Functions},
author = {Alex Devonport and Forest Yang and Laurent El Ghaoui and Murat Arcak},
journal= {arXiv preprint arXiv:2104.13902},
year = {2021}
}
Comments
7 pages, 3 figures. Submitted to IEEE CDC 2021