Fixed-Parameter Tractability of Hedge Cut
Abstract
In the Hedge Cut problem, the edges of a graph are partitioned into groups called hedges, and the question is what is the minimum number of hedges to delete to disconnect the graph. Ghaffari, Karger, and Panigrahi [SODA 2017] showed that Hedge Cut can be solved in quasipolynomial-time, raising the hope for a polynomial time algorithm. Jaffke, Lima, Masar\'ik, Pilipczuk, and Souza [SODA 2023] complemented this result by showing that assuming the Exponential Time Hypothesis (ETH), no polynomial-time algorithm exists. In this paper, we show that Hedge Cut is fixed-parameter tractable parameterized by the solution size by providing an algorithm with running time O( n) + · mO(1), which can be upper bounded by c · (n+m)O(1) for any constant c>1. This running time captures at the same time the fact that the problem is quasipolynomial-time solvable, and that it is fixed-parameter tractable parameterized by . We further generalize this algorithm to an algorithm with running time O(k n) + · nO(k) · mO(1) for Hedge k-Cut.
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