Detecting Feedback Vertex Sets of Size k in O*(2.7^k) Time

Publication date

2020

Authors

Li, Jason
Nederlof, Jesper

Editors

Chawla, Shuchi

Advisors

Supervisors

Document Type

Part of book
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License

taverne

Abstract

In the Feedback Vertex Set problem, one is given an undirected graph G and an integer k, and one needs to determine whether there exists a set of k vertices that intersects all cycles of G (a so-called feedback vertex set). Feedback Vertex Set is one of the most central problems in parameterized complexity: It served as an excellent test bed for many important algorithmic techniques in the field such as Iterative Compression [Guo et al. (JCSS'06)], Randomized Branching [Becker et al. (J. Artif. Intell. Res'00)] and Cut&Count [Cygan et al. (FOCS'11)]. In particular, there has been a long race for the smallest dependence f (k) in run times of the type O*(f (k)), where the O* notation omits factors polynomial in n. This race seemed to be run in 2011, when a randomized O*(3k) time algorithm based on Cut&Count was introduced. In this work, we show the contrary and give a O*(2.7k) time randomized algorithm. Our algorithm combines all mentioned techniques with substantial new ideas: First, we show that, given a feedback vertex set of size k of bounded average degree, a tree decomposition of width (1 – Ω(1))k can be found in polynomial time. Second, we give a randomized branching strategy inspired by the one from [Becker et al. (J. Artif. Intell. Res’00)] to reduce to the aforementioned bounded average degree setting. Third, we obtain significant run time improvements by employing fast matrix multiplication.

Keywords

Taverne

Citation

Li, J & Nederlof, J 2020, Detecting Feedback Vertex Sets of Size k in O*(2.7^k) Time. in S Chawla (ed.), Proceedings of the 2020 ACM-SIAM Symposium on Discrete Algorithms (SODA). SIAM, pp. 971-989. https://doi.org/10.1137/1.9781611975994.58