On the Parameterized Complexity of Reconfiguration of Connected Dominating Sets

TL;DR

This paper investigates the parameterized complexity of reconfiguring connected dominating sets, revealing increased difficulty with connectivity constraints but also identifying fixed-parameter tractability and kernelization results.

Contribution

It demonstrates that adding connectivity constraints makes the reconfiguration problem W[1]-hard, yet shows fixed-parameter tractability and polynomial kernelization on planar graphs.

Findings

ifficulties introduced by connectivity constraints

Fixed-parameter tractability of CDS-R with respect to k

Polynomial kernelization on planar graphs

Abstract

In a reconfiguration version of an optimization problem $\mathcal{Q}$ the input is an instance of $\mathcal{Q}$ and two feasible solutions $S$ and $T$. The objective is to determine whether there exists a step-by-step transformation between $S$ and $T$ such that all intermediate steps also constitute feasible solutions. In this work, we study the parameterized complexity of the \textsc{Connected Dominating Set Reconfiguration} problem (\textsc{CDS-R)}. It was shown in previous work that the \textsc{Dominating Set Reconfiguration} problem (\textsc{DS-R}) parameterized by $k$, the maximum allowed size of a dominating set in a reconfiguration sequence, is fixed-parameter tractable on all graphs that exclude a biclique $K_{d,d}$ as a subgraph, for some constant $d \geq 1$. We show that the additional connectivity constraint makes the problem much harder, namely, that \textsc{CDS-R} is \textsf{W}$[1]$-hard parameterized by $k+\ell$, the maximum allowed size of a dominating set plus the length of the reconfiguration sequence, already on $5$-degenerate graphs. On the positive side, we show that \textsc{CDS-R} parameterized by $k$ is fixed-parameter tractable, and in fact admits a polynomial kernel on planar graphs.