English

How much does a treedepth modulator help to obtain polynomial kernels beyond sparse graphs?

Data Structures and Algorithms 2018-06-07 v2 Computational Complexity Combinatorics

Abstract

In the last years, kernelization with structural parameters has been an active area of research within the field of parameterized complexity. As a relevant example, Gajarsk{\`y} et al. [ESA 2013] proved that every graph problem satisfying a property called finite integer index admits a linear kernel on graphs of bounded expansion and an almost linear kernel on nowhere dense graphs, parameterized by the size of a cc-treedepth modulator, which is a vertex set whose removal results in a graph of treedepth at most cc, where c1c \geq 1 is a fixed integer. The authors left as further research to investigate this parameter on general graphs, and in particular to find problems that, while admitting polynomial kernels on sparse graphs, behave differently on general graphs. In this article we answer this question by finding two very natural such problems: we prove that Vertex Cover admits a polynomial kernel on general graphs for any integer c1c \geq 1, and that Dominating Set does not for any integer c2c \geq 2 even on degenerate graphs, unless NPcoNP/poly\text{NP} \subseteq \text{coNP}/\text{poly}. For the positive result, we build on the techniques of Jansen and Bodlaender [STACS 2011], and for the negative result we use a polynomial parameter transformation for c3c\geq 3 and an OR-cross-composition for c=2c = 2. As existing results imply that Dominating Set admits a polynomial kernel on degenerate graphs for c=1c = 1, our result provides a dichotomy about the existence of polynomial kernels for Dominating Set on degenerate graphs with this parameter.

Keywords

Cite

@article{arxiv.1609.08095,
  title  = {How much does a treedepth modulator help to obtain polynomial kernels beyond sparse graphs?},
  author = {Marin Bougeret and Ignasi Sau},
  journal= {arXiv preprint arXiv:1609.08095},
  year   = {2018}
}

Comments

23 pages, 3 figures

R2 v1 2026-06-22T16:01:50.103Z