Randomized quasi-Monte Carlo for walk on spheres

Abstract

We investigate the use of randomized quasi-Monte Carlo (RQMC) in walk on spheres algorithms to solve boundary value problems for functions with Dirichlet boundary conditions in Rd. For harmonic functions with d=2, the integrands of interest are periodic indicator functions over regions in the torus Tk. We give conditions for ∂ to have k-1 dimensional Minkowski content which allows us to use results of He and Wang (2015). The RQMC estimates involve multiple values of k. We see sampling variances decreasing with the number n of sample points at slightly better than Monte Carlo rates. The median variance rate in 4 RQMC methods over 5 worked examples, including some with d=3 and some with nonzero source functions, was slightly better than O(n-1.1). The variance reduction factors ranged from 1.8 to 10.7 at n=217. None of the four RQMC methods dominated the others.