Approximation algorithms for the normalizing constant of Gibbs distributions

Abstract

Consider a family of distributions \πβ\ where Xπβ means that P(X=x)=(-β H(x))/Z(β). Here Z(β) is the proper normalizing constant, equal to Σx(-β H(x)). Then \πβ\ is known as a Gibbs distribution, and Z(β) is the partition function. This work presents a new method for approximating the partition function to a specified level of relative accuracy using only a number of samples, that is, O((Z(β))((Z(β)))) when Z(0)≥1. This is a sharp improvement over previous, similar approaches that used a much more complicated algorithm, requiring O((Z(β))((Z(β)))5) samples.