Monotone Submodular Multiway Partition

Abstract

In submodular multiway partition (SUB-MP), the input is a non-negative submodular function f:2V → R 0 given by an evaluation oracle along with k terminals t1, t2, …, tk∈ V. The goal is to find a partition V1, V2, …, Vk of V with ti∈ Vi for every i∈ [k] in order to minimize Σi=1k f(Vi). In this work, we focus on SUB-MP when the input function is monotone (termed MONO-SUB-MP). MONO-SUB-MP formulates partitioning problems over several interesting structures -- e.g., matrices, matroids, graphs, and hypergraphs. MONO-SUB-MP is NP-hard since the graph multiway cut problem can be cast as a special case. We investigate the approximability of MONO-SUB-MP: we show that it admits a 4/3-approximation and does not admit a (10/9-ε)-approximation for every constant ε>0. Next, we study a special case of MONO-SUB-MP where the monotone submodular function of interest is the coverage function of an input graph, termed GRAPH-COVERAGE-MP. GRAPH-COVERAGE-MP is equivalent to the classic multiway cut problem for the purposes of exact optimization. We show that GRAPH-COVERAGE-MP admits a 1.125-approximation and does not admit a (1.00074-ε)-approximation for every constant ε>0 assuming the Unique Games Conjecture. These results separate GRAPH-COVERAGE-MP from graph multiway cut in terms of approximability.

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