Estimating the Nash Social Welfare for coverage and other submodular valuations

Abstract

We study the Nash Social Welfare problem: Given n agents with valuation functions vi:2[m] → R, partition [m] into S1,…,Sn so as to maximize (Πi=1n vi(Si))1/n. The problem has been shown to admit a constant-factor approximation for additive, budget-additive, and piecewise linear concave separable valuations; the case of submodular valuations is open. We provide a 1e (1-1e)2-approximation of the optimal value for several classes of submodular valuations: coverage, sums of matroid rank functions, and certain matching-based valuations.

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