Deciding Reachability for 3-Dimensional Multi-Linear Systems
Abstract
This paper deals with the problem of point-to-point reachability in multi-linear systems. These systems consist of a partition of the Euclidean space into a finite number of regions and a constant derivative assigned to each region in the partition, which governs the dynamical behavior of the system within it. The reachability problem for multi-linear systems has been proven to be decidable for the two-dimensional case and undecidable for the dimension three and higher. Multi-linear systems however exhibit certain properties that make them very suitable for topological analysis. We prove that reachability can be decided exactly in the 3-dimensional case when systems satisfy certain conditions. We show with experiments that our approach can be orders of magnitude more efficient than simulation.
Cite
@article{arxiv.1106.1245,
title = {Deciding Reachability for 3-Dimensional Multi-Linear Systems},
author = {Olga Tveretina and Daniel Funke},
journal= {arXiv preprint arXiv:1106.1245},
year = {2011}
}
Comments
In Proceedings GandALF 2011, arXiv:1106.0814