Parameterized Complexity of Directed Steiner Tree on Sparse Graphs

TL;DR

This paper investigates the parameterized complexity of the Directed Steiner Tree problem on sparse graphs, identifying tractability borders and providing optimal algorithms under various graph restrictions.

Contribution

It precisely characterizes the fixed parameter tractability of DST on sparse graphs based on graph minors and degeneracy, and extends techniques to Dominating Set.

Findings

FPT on graphs excluding a topological minor

W[2]-hard on graphs of degeneracy 2

Optimal algorithms for DST and Dominating Set on sparse graphs

Abstract

We study the parameterized complexity of the directed variant of the classical {\sc Steiner Tree} problem on various classes of directed sparse graphs. While the parameterized complexity of {\sc Steiner Tree} parameterized by the number of terminals is well understood, not much is known about the parameterization by the number of non-terminals in the solution tree. All that is known for this parameterization is that both the directed and the undirected versions are W[2]-hard on general graphs, and hence unlikely to be fixed parameter tractable FPT. The undirected {\sc Steiner Tree} problem becomes FPT when restricted to sparse classes of graphs such as planar graphs, but the techniques used to show this result break down on directed planar graphs. In this article we precisely chart the tractability border for {\sc Directed Steiner Tree} (DST) on sparse graphs parameterized by the number of non-terminals in the solution tree. Specifically, we show that the problem is fixed parameter tractable on graphs excluding a topological minor, but becomes W[2]-hard on graphs of degeneracy 2. On the other hand we show that if the subgraph induced by the terminals is required to be acyclic then the problem becomes FPT on graphs of bounded degeneracy. We further show that our algorithm achieves the best possible running time dependence on the solution size and degeneracy of the input graph, under standard complexity theoretic assumptions. Using the ideas developed for DST, we also obtain improved algorithms for {\sc Dominating Set} on sparse undirected graphs. These algorithms are asymptotically optimal.