Local Max-Cut on Sparse Graphs

Abstract

We bound the smoothed running time of the FLIP algorithm for local Max-Cut as a function of α, the arboricity of the input graph. We show that, with high probability and in expectation, the following holds (where n is the number of nodes and φ is the smoothing parameter): 1) When α = O(1-δ n) FLIP terminates in φ poly(n) iterations, where δ ∈ (0,1] is an arbitrarily small constant. Previous to our results the only graph families for which FLIP was known to achieve a smoothed polynomial running time were complete graphs and graphs with logarithmic maximum degree. 2) For arbitrary values of α we get a running time of φ nO(α n + α). This improves over the best known running time for general graphs of φ nO( n ) for α = o(1.5 n). Specifically, when α = O( n) we get a significantly faster running time of φ nO( n).

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