Detecting and Characterizing Small Dense Bipartite-like Subgraphs by the Bipartiteness Ratio Measure

Abstract

We study the problem of finding and characterizing subgraphs with small bipartiteness ratio. We give a bicriteria approximation algorithm |SwpDB| such that if there exists a subset S of volume at most k and bipartiteness ratio θ, then for any 0<ε<1/2, it finds a set S' of volume at most 2k1+ε and bipartiteness ratio at most 4θ/ε. By combining a truncation operation, we give a local algorithm |LocDB|, which has asymptotically the same approximation guarantee as the algorithm |SwpDB| on both the volume and bipartiteness ratio of the output set, and runs in time O(ε2θ-2k1+ε3k), independent of the size of the graph. Finally, we give a spectral characterization of the small dense bipartite-like subgraphs by using the kth largest eigenvalue of the Laplacian of the graph.