Geodetic Set on Graphs of Constant Pathwidth and Feedback Vertex Set Number

Abstract

In the Geodetic Set problem, the input consists of a graph G and a positive integer k. The goal is to determine whether there exists a subset S of vertices of size k such that every vertex in the graph is included in a shortest path between two vertices in S. Kellerhals and Koana [IPEC 2020; J. Graph Algorithms Appl 2022] proved that the problem is [1]-hard when parameterized by the pathwidth and the feedback vertex set number of the input graph. They posed the question of whether the problem admits an algorithm when parameterized by the combination of these two parameters. We answer this in negative by proving that the problem remains -hard on graphs of constant pathwidth and feedback vertex set number.

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