A Query-Efficient Quantum Algorithm for Maximum Matching on General Graphs

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Authors Shelby Kimmel, R. Teal Witter arXiv ID 2010.02324 Category cs.DS: Data Structures & Algorithms Cross-listed quant-ph Citations 5 Venue Workshop on Algorithms and Data Structures Last Checked 4 months ago
Abstract
We design quantum algorithms for maximum matching. Working in the query model, in both adjacency matrix and adjacency list settings, we improve on the best known algorithms for general graphs, matching previously obtained results for bipartite graphs. In particular, for a graph with $n$ nodes and $m$ edges, our algorithm makes $O(n^{7/4})$ queries in the matrix model and $O(n^{3/4}(m+n)^{1/2})$ queries in the list model. Our approach combines Gabow's classical maximum matching algorithm [Gabow, Fundamenta Informaticae, '17] with the guessing tree method of Beigi and Taghavi [Beigi and Taghavi, Quantum, '20].
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