Improved approximation ratios for the Quantum Max-Cut problem on general, triangle-free and bipartite graphs
Abstract
We study polynomial-time approximation algorithms for the Quantum Max-Cut (QMC) problem. Given an edge-weighted graph G on n vertices, the QMC problem is to determine the largest eigenvalue of a particular 2n × 2n matrix that corresponds to G. We provide a sharpened analysis of the currently best-known QMC approximation algorithm for general graphs. This algorithm achieves an approximation ratio of 0.599, which our analysis improves to 0.603. Additionally, we propose two new approximation algorithms for the QMC problem on triangle-free and bipartite graphs, that achieve approximation ratios of 0.61383 and 0.8162, respectively. These are the best-known approximation ratios for their respective graph classes.
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