Length-Bounded Cuts: Proper Interval Graphs and Structural Parameters
Abstract
In the presented paper we study the Length-Bounded Cut problem for special graph classes as well as from a parameterized-complexity viewpoint. Here, we are given a graph , two vertices and , and positive integers and . The task is to find a set of edges of size at most such that every --path of length at most in contains some edge in . Bazgan et al. conjectured that Length-Bounded Cut admits a polynomial-time algorithm if the input graph is a~proper interval graph. We confirm this conjecture by showing a dynamic-programming based polynomial-time algorithm. We strengthen the W[1]-hardness result of Dvo\v{r}\'ak and Knop. Our reduction is shorter, seems simpler to describe, and the target of the reduction has stronger structural properties. Consequently, we give W[1]-hardness for the combined parameter pathwidth and maximum degree of the input graph. Finally, we prove that Length-Bounded Cut is W[1]-hard for the feedback vertex number. Both our hardness results complement known XP algorithms.
Cite
@article{arxiv.1910.03409,
title = {Length-Bounded Cuts: Proper Interval Graphs and Structural Parameters},
author = {Matthias Bentert and Klaus Heeger and Dušan Knop},
journal= {arXiv preprint arXiv:1910.03409},
year = {2019}
}
Comments
24 pages