Abstract
In this paper, we study the Target Set Selection problem from a parameterized complexity perspective. Here for a given graph and a threshold for each vertex, the task is to find a set of vertices (called a target set) that activates the whole graph during the following iterative process. A vertex outside the active set becomes active if the number of so far activated vertices in its neighborhood is at least its threshold. We give two parameterized algorithms for a special case where each vertex has the threshold set to half of its neighbors (the so-called Majority Target Set Selection problem) for parameterizations by the neighborhood diversity and the twin cover number of the input graph. We complement these results from the negative side. We give a hardness proof for the Majority Target Set Selection problem when parameterized by (a restriction of) the modular-width---a natural generalization of both previous structural parameters. We also show the Target Set Selection problem parameterized by the neighborhood diversity or by the twin cover number is \sf W[1]-hard when there is no restriction on the thresholds.
Highlights
IntroductionWe study the Target Set Selection problem ( called Dynamic Monopolies), using notation according to Kempe et al [16], from parameterized complexity perspective
We show that the Target Set Selection problem parameterized by the neighborhood diversity when there is no restriction on the thresholds is W[1]-hard
We study the Target Set Selection problem, using notation according to Kempe et al [16], from parameterized complexity perspective
Summary
We study the Target Set Selection problem ( called Dynamic Monopolies), using notation according to Kempe et al [16], from parameterized complexity perspective. We use standard notions of parameterized complexity, see [9]. Let G = (V, E) be a graph, S ⊆ V , and f : V → N be a threshold function. The activation process arising from the set S0 = S is an iterative process with resulting sets S0, S1, . 18:2 Target Set Selection in Dense Graph Classes where by N (v) we denote the set of vertices adjacent to v. Note that after at most n = |V | rounds the activation process has to stabilize – that is, Sn = Sn+i for all i > 0. We say that the set S is a target set if Sn = V
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