Exact ∞-separation radius of Sobol' sequences in dimension 2

Abstract

Quasi-uniformity is a fundamental geometric property of point sets, crucial for applications such as kernel interpolation, Gaussian process regression, and space-filling experimental designs. While quasi-Monte Carlo methods are widely recognized for their low-discrepancy characteristics, understanding their quasi-uniformity remains important for practical applications. For the two-dimensional Sobol' sequence, Sobol' and Shukhman (2007) conjectured that the separation radius of the first N points achieves the optimal rate N-1/2, which would imply quasi-uniformity. This conjecture was disproved by Goda (2024), who computed exact values of the 2-separation radius for a sparse subsequence N = 22v-1. However, the general behavior of the Sobol' sequence for arbitrary N remained unclear. In this paper, we derive exact expressions for the ∞-separation radius of the first N = 2m points of the two-dimensional Sobol' sequence for all m ∈ N. As an immediate consequence, we show that the separation radius of Sobol' points is O(N-3/4), which is strictly worse than the optimal rate N-1/2, revealing that the two-dimensional Sobol' sequence has a suboptimal mesh ratio that grows at least as N1/4.