Approximation Algorithms for Norm Multiway Cut

Abstract

We consider variants of the classic Multiway Cut problem. Multiway Cut asks to partition a graph G into k parts so as to separate k given terminals. Recently, Chandrasekaran and Wang (ESA 2021) introduced p-norm Multiway, a generalization of the problem, in which the goal is to minimize the p norm of the edge boundaries of k parts. We provide an O(1/2 n1/2+1/p k) approximation algorithm for this problem, improving upon the approximation guarantee of O(3/2 n 1/2 k) due to Chandrasekaran and Wang. We also introduce and study Norm Multiway Cut, a further generalization of Multiway Cut. We assume that we are given access to an oracle, which answers certain queries about the norm. We present an O(1/2 n 7/2 k) approximation algorithm with a weaker oracle and an O(1/2 n 5/2 k) approximation algorithm with a stronger oracle. Additionally, we show that without any oracle access, there is no n1/4- approximation algorithm for every > 0 assuming the Hypergraph Dense-vs-Random Conjecture.