Multidimensional examples of the Metropolis algorithm

Abstract

Consider the problem of approximating a given probability distribution on the cube [0,1]n via the use of a square lattice discretization with mesh-size 1/N and the Metropolis algorithm. Here the dimension n is fixed and we focus for the most part on the case n=2. In order to understand the speed of convergence of such a procedure, one needs to control the spectral gap, λ, of the associated finite Markov chain, and how it depends on the parameter N. In this work, we study basic examples for which good upper-bounds and lower-bounds on λ can be obtained via appropriate application of path techniques.