A Linear Kernel for Planar Vector Domination

Abstract

Given a graph G, an integer k≥ 0, and a non-negative integral function f:V(G) → N, the Vector Domination problem asks whether a set S of vertices, of cardinality k or less, exists in G so that every vertex v ∈ V(G) S has at least f(v) neighbors in S. The problem generalizes several domination problems and it has also been shown to generalize Bounded-Degree Vertex Deletion (BDVD). In this paper, the parameterized version of Vector Domination is studied when the input graph is planar. A linear problem kernel is presented. A direct consequence is a kernel bound for BDVD that is linear in the parameter k only. Previously known bounds are functions of both the target degree and the input parameter.

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