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FSTTCS
2009
Springer

Kernels for Feedback Arc Set In Tournaments

14 years 5 months ago
Kernels for Feedback Arc Set In Tournaments
A tournament T = (V, A) is a directed graph in which there is exactly one arc between every pair of distinct vertices. Given a digraph on n vertices and an integer parameter k, the Feedback Arc Set problem asks whether the given digraph has a set of k arcs whose removal results in an acyclic digraph. The Feedback Arc Set problem restricted to tournaments is known as the k-Feedback Arc Set in Tournaments (k-FAST) problem. In this paper we obtain a linear vertex kernel for k-FAST. That is, we give a polynomial time algorithm which given an input instance T to k-FAST obtains an equivalent instance T on O(k) vertices. In fact, given any fixed > 0, the kernelized instance has at most (2 + )k vertices. Our result improves the previous known bound of O(k2 ) on the kernel size for k-FAST. For our kernelization algorithm we find a subclass of tournaments where one can find a minimum sized feedback arc set in polynomial time and use the known polynomial time approximation scheme for k-FAS...
Stéphane Bessy, Fedor V. Fomin, Serge Gaspe
Added 26 May 2010
Updated 26 May 2010
Type Conference
Year 2009
Where FSTTCS
Authors Stéphane Bessy, Fedor V. Fomin, Serge Gaspers, Christophe Paul, Anthony Perez, Saket Saurabh, Stéphan Thomassé
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