An FPT Algorithm for the Exact Matching Problem and NP-hardness of Related Problems

May 05, 2024 Β· Declared Dead Β· πŸ› IEICE Trans. Inf. Syst.

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Authors Hitoshi Murakami, Yutaro Yamaguchi arXiv ID 2405.02829 Category cs.DS: Data Structures & Algorithms Cross-listed math.CO Citations 1 Venue IEICE Trans. Inf. Syst. Last Checked 4 months ago
Abstract
The exact matching problem is a constrained variant of the maximum matching problem: given a graph with each edge having a weight $0$ or $1$ and an integer $k$, the goal is to find a perfect matching of weight exactly $k$. Mulmuley, Vazirani, and Vazirani (1987) proposed a randomized polynomial-time algorithm for this problem, and it is still open whether it can be derandomized. Very recently, El Maalouly, Steiner, and Wulf (2023) showed that for bipartite graphs there exists a deterministic FPT algorithm parameterized by the (bipartite) independence number. In this paper, by extending a part of their work, we propose a deterministic FPT algorithm in general parameterized by the minimum size of an odd cycle transversal in addition to the (bipartite) independence number. We also consider a relaxed problem called the correct parity matching problem, and show that a slight generalization of an equivalent problem is NP-hard.
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