Random walks in a convex body and an improved volume algorithm

Abstract

We give a randomized algorithm usingO(n⁷log²n) separation calls to approximate the volume of a convex body with a fixed relative error. The bound isO(n⁶log⁴n) for centrally symmpetric bodies and for polytopes with a polynomial number of facets, andO(n⁵log⁴n) for centrally symmetric polytopes with a polynomial number of facets. We also give anO(n⁶logn) algorithm to sample a point from the uniform distribution over a convex body. Several tools are developed that may be interesting on their own. We extend results of Sinclair–Jerrum [43] and the authors [34] on the mixing rate of Markov chains from finite to arbitrary Markov chains. We also analyze the mixing rate of various random walks on convex bodies, in particular the random walk with steps from the uniform distribution over a unit ball. © 1993 John Wiley & Sons, Inc.