Linear kernels for outbranching problems in sparse digraphs

September 05, 2015 Β· Declared Dead Β· πŸ› Algorithmica

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Authors Marthe Bonamy, Łukasz Kowalik, MichaΕ‚ Pilipczuk, Arkadiusz SocaΕ‚a arXiv ID 1509.01675 Category cs.DS: Data Structures & Algorithms Citations 2 Venue Algorithmica Last Checked 4 months ago
Abstract
In the $k$-Leaf Out-Branching and $k$-Internal Out-Branching problems we are given a directed graph $D$ with a designated root $r$ and a nonnegative integer $k$. The question is to determine the existence of an outbranching rooted at $r$ that has at least $k$ leaves, or at least $k$ internal vertices, respectively. Both these problems were intensively studied from the points of view of parameterized complexity and kernelization, and in particular for both of them kernels with $O(k^2)$ vertices are known on general graphs. In this work we show that $k$-Leaf Out-Branching admits a kernel with $O(k)$ vertices on $\mathcal{H}$-minor-free graphs, for any fixed family of graphs $\mathcal{H}$, whereas $k$-Internal Out-Branching admits a kernel with $O(k)$ vertices on any graph class of bounded expansion.
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