Weighted Lp-Discrepancy Bounds for Parametric Stratified Sampling and Applications to High-Dimensional Integration

Abstract

This paper studies the expected Lp-discrepancy (2 ≤ p < ∞) for stratified sampling schemes under importance sampling. We introduce a parametric family of equivolume partitions θ, and leverage recent exact formulas for the expected L2-discrepancy xian2025improved. Our main contribution is a weighted discrepancy reduction lemma that relates weighted Lp-discrepancy to standard Lp-discrepancy with explicit constants depending on the weight function. For p=2, we obtain explicit bounds using the exact discrepancy formulas. For p>2, we derive probabilistic bounds via dyadic chaining techniques. The results yield uniform error estimates for multivariate integration in Sobolev spaces H1(K) and F*d,q, demonstrating improved performance over classical jittered sampling in importance sampling scenarios. Numerical experiments validate our theoretical findings and illustrate the practical advantages of parametric stratified sampling.

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