Error bounds for quasi-Monte Carlo integration for L∞ with uniform point sets

Abstract

Niederreiter [H.Niederreiter, Error bounds for quasi-Monte Carlo integration with uniform point sets, Journal of computational and applied mathematics 150 (2003), 283-292] established new bounds for quasi-Monte Carlo integration for nodes sets with a special kind of uniformity property. Let (X,A,μ) be an arbitrary probability space, i.e., X is an arbitrary nonempty set, A a σ-algebra of subsets of X, and μa probability measure defined on A. The functions considered in Niederreiter's paper are bounded μ-integrable functions on X. In this note, we extend some of his results for bounded μ-integrable functions to essentially bounded A-measurable functions. So Niederreiter's bounds can be used in a more general setting.