Improved FPT algorithms for weighted independent set in bull-free graphs

Abstract

Very recently, Thomass\'e, Trotignon and Vuskovic [WG 2014] have given an FPT algorithm for Weighted Independent Set in bull-free graphs parameterized by the weight of the solution, running in time 2O(k5) · n9. In this article we improve this running time to 2O(k2) · n7. As a byproduct, we also improve the previous Turing-kernel for this problem from O(k5) to O(k2). Furthermore, for the subclass of bull-free graphs without holes of length at most 2p-1 for p ≥ 3, we speed up the running time to 2O(k · k1p-1) · n7. As p grows, this running time is asymptotically tight in terms of k, since we prove that for each integer p ≥ 3, Weighted Independent Set cannot be solved in time 2o(k) · nO(1) in the class of \bull,C4,…,C2p-1\-free graphs unless the ETH fails.