On Sparsest Cut and Conductance in Directed Polymatroidal Networks

Abstract

We consider algorithms and spectral bounds for sparsest cut and conductance in directed polymatrodal networks. This is motivated by recent work on submodular hypergraphs Yoshida19,LiM18,ChenOT23,Veldt23 and previous work on multicommodity flows and cuts in polymatrodial networks ChekuriKRV15. We obtain three results. First, we obtain an O( n)-approximation for sparsest cut and point out how this generalizes the result in ChenOT23. Second, we consider the symmetric version of conductance and obtain an O(OPT r) approximation where r is the maximum degree and we point out how this generalizes previous work on vertex expansion in graphs. Third, we prove a non-constructive Cheeger like inequality that generalizes previous work on hypergraphs. We provide a unified treatment via line-embeddings which were shown to be effective for submodular cuts in ChekuriKRV15.

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