Connecting Max-entropy With Computational Geometry, LP And SDP

Abstract

We consider the well-known max-(relative) entropy problem (y) = infQ DKL(Q P ) with Kullback-Leibler divergence on a domain ⊂ R d , and with ''moment'' constraints h dQ = y, y ∈ R m . We show that when m d, is the Cram\'er transform of a function v that solves a simply related computational geometry problem. Also, and remarkably, to the canonical LP: min x0 c T x\,: A x = y, with A ∈ R mxd , one may associate a max-entropy problem with a suitably chosen reference measure P on R d + and linear mapping h(x) = Ax, such that its associated perspective function ε (y/ε) is the optimal value of the log-barrier formulation (with parameter ε) of the dual LP (and so it converges to the LP optimal value as ε → 0). An analogous result also holds for the canonical SDP: min X 0 C, X\,: A(X) = y .