Vector Addition System Reversible Reachability Problem
J. Leroux. Logical Methods in Computer Science, (2013)
Abstract
The reachability problem for vector addition systems is a central problem of net theory. This problem is known to be decidable but the complexity is still unknown. Whereas the problem is EXPSPACE-hard, no elementary upper bounds complexity are known. In this paper we consider the reversible reachability problem. This problem consists to decide if two configurations are reachable one from each other, or equivalently if they are in the same strongly connected component of the reachability graph. We show that this problem is EXPSPACE-complete. As an application of the introduced materials we characterize the reversibility domains of a vector addition system.
%0 Journal Article
%1 journals/corr/abs-1301-4874
%A Leroux, Jérôme
%D 2013
%J Logical Methods in Computer Science
%K petrinets reachability semilinear
%N 1
%T Vector Addition System Reversible Reachability Problem
%U https://arxiv.org/abs/1301.4874
%V 9
%X The reachability problem for vector addition systems is a central problem of net theory. This problem is known to be decidable but the complexity is still unknown. Whereas the problem is EXPSPACE-hard, no elementary upper bounds complexity are known. In this paper we consider the reversible reachability problem. This problem consists to decide if two configurations are reachable one from each other, or equivalently if they are in the same strongly connected component of the reachability graph. We show that this problem is EXPSPACE-complete. As an application of the introduced materials we characterize the reversibility domains of a vector addition system.
@article{journals/corr/abs-1301-4874,
abstract = {The reachability problem for vector addition systems is a central problem of net theory. This problem is known to be decidable but the complexity is still unknown. Whereas the problem is EXPSPACE-hard, no elementary upper bounds complexity are known. In this paper we consider the reversible reachability problem. This problem consists to decide if two configurations are reachable one from each other, or equivalently if they are in the same strongly connected component of the reachability graph. We show that this problem is EXPSPACE-complete. As an application of the introduced materials we characterize the reversibility domains of a vector addition system. },
added-at = {2020-02-08T19:22:09.000+0100},
author = {Leroux, Jérôme},
biburl = {https://www.bibsonomy.org/bibtex/263d6fd4f2bffa7e5244c8cec90008655/paves_intern},
ee = {http://arxiv.org/abs/1301.4874},
interhash = {9e799ca26d799aa71a30922303eece84},
intrahash = {63d6fd4f2bffa7e5244c8cec90008655},
journal = {Logical Methods in Computer Science},
keywords = {petrinets reachability semilinear},
number = 1,
timestamp = {2020-02-08T19:22:09.000+0100},
title = {Vector Addition System Reversible Reachability Problem},
url = {https://arxiv.org/abs/1301.4874},
volume = 9,
year = 2013
}