Bidimensionality and Kernels

TL;DR

This paper extends Bidimensionality Theory by establishing a connection between bidimensional problems and the existence of linear kernels, enabling polynomial kernelization for many problems on H-minor-free graph classes.

Contribution

It introduces a new meta-algorithmic approach linking bidimensionality to linear kernels for problems expressible in CMSO logic.

Findings

Proves that certain bidimensional problems admit linear kernels on H-minor-free graphs.

Establishes that many problems previously lacking polynomial kernels now have such kernels.

Provides a unified framework for kernelization results in graph classes.

Abstract

Bidimensionality Theory was introduced by [E.D. Demaine, F.V. Fomin, M.Hajiaghayi, and D.M. Thilikos. Subexponential parameterized algorithms on graphs of bounded genus and H-minor-free graphs, J. ACM, 52 (2005), pp.866--893] as a tool to obtain sub-exponential time parameterized algorithms on H-minor-free graphs. In [E.D. Demaine and M.Hajiaghayi, Bidimensionality: new connections between FPT algorithms and PTASs, in Proceedings of the 16th Annual ACM-SIAM Symposium on Discrete Algorithms (SODA), SIAM, 2005, pp.590--601] this theory was extended in order to obtain polynomial time approximation schemes (PTASs) for bidimensional problems. In this work, we establish a third meta-algorithmic direction for bidimensionality theory by relating it to the existence of linear kernels for parameterized problems. In particular, we prove that every minor (respectively contraction) bidimensional problem that satisfies a separation property and is expressible in Countable Monadic Second Order Logic (CMSO), admits a linear kernel for classes of graphs that exclude a fixed graph (respectively an apex graph) H as a minor. Our results imply that a multitude of bidimensional problems g graph classes. For most of these problems no polynomial kernels on H-minor-free graphs were known prior to our work.