Finding small-width connected path decompositions in polynomial time
Data Structures and Algorithms
2021-01-19 v2 Computational Complexity
Discrete Mathematics
Abstract
A connected path decomposition of a simple graph is a path decomposition such that the subgraph of induced by is connected for each . The connected pathwidth of is then the minimum width over all connected path decompositions of . We prove that for each fixed , the connected pathwidth of any input graph can be computed in polynomial-time. This answers an open question raised by Fedor V. Fomin during the GRASTA 2017 workshop, since connected pathwidth is equivalent to the connected (monotone) node search game.
Cite
@article{arxiv.1802.05501,
title = {Finding small-width connected path decompositions in polynomial time},
author = {Dariusz Dereniowski and Dorota Osula and Paweł Rzążewski},
journal= {arXiv preprint arXiv:1802.05501},
year = {2021}
}