Allocating Variance to Maximize Expectation
Abstract
We design efficient approximation algorithms for maximizing the expectation of the supremum of families of Gaussian random variables. In particular, let OPT:=σ1,·s,σnE[Σj=1mi∈ Sj Xi], where Xi are Gaussian, Sj⊂[n] and Σiσi2=1, then our theoretical results include: - We characterize the optimal variance allocation -- it concentrates on a small subset of variables as |Sj| increases, - A polynomial time approximation scheme (PTAS) for computing OPT when m=1, and - An O( n) approximation algorithm for computing OPT for general m>1. Such expectation maximization problems occur in diverse applications, ranging from utility maximization in auctions markets to learning mixture models in quantitative genetics.
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