Please use this identifier to cite or link to this item: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/4974
Title: Parameterized Complexity of Fair Feedback Vertex Set Problem
Authors: Kanesh, Lawqueen
MAITY, SOUMEN
MULUK, KOMAL
Saurabh, Saket
Fernau, Henning
Dept. of Mathematics
Keywords: Feedback vertex set
Parameterized
Complexity
FPT
W[1]-hard
TOC-AUG-2020
2020
2020-AUG-WEEK3
Issue Date: Jun-2020
Publisher: Springer
Citation: Computer Science – Theory and Applications, 250-262.
Abstract: Given a graph G=(V,E) , a subset S⊆V(G) is said to be a feedback vertex set of G if G−S is a forest. In the Feedback Vertex Set (FVS) problem, we are given an undirected graph G, and a positive integer k, the question is whether there exists a feedback vertex set of size at most k. This problem is extremely well studied in the realm of parameterized complexity. In this paper, we study three variants of the FVS problem: Unrestricted Fair FVS, Restricted Fair FVS, and Relax Fair FVS. In Unrestricted Fair FVS problem, we are given a graph G and a positive integer ℓ , the question is does there exists a feedback vertex set S⊆V(G) (of any size) such that for every vertex v∈V(G) , v has at most ℓ neighbours in S. First, we study Unrestricted Fair FVS from different parameterizations such as treewidth, treedepth and neighbourhood diversity and obtain several results (both tractability and intractability). Next, we study Restricted Fair FVS problem, where we are also given an integer k in the input and we demand the size of S to be at most k. This problem is trivially NP-complete; we show that Restricted Fair FVS problem when parameterized by the solution size k and the maximum degree Δ of the graph G, admits a kernel of size O((k+Δ)2) . Finally, we study Relax Fair FVS problem, where we want that the size of S is at most k and for every vertex outside S, that is, for all v∈V(G)∖S , v has at most ℓ neighbours in S. We give an FPT algorithm for Relax Fair FVS problem running in time cknO(1) , for a fixed constant c.
URI: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/4974
https://link.springer.com/chapter/10.1007%2F978-3-030-50026-9_18
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