English

The Pair Correlation Function of Multi-Dimensional Low-Discrepancy Sequences with Small Stochastic Error Terms

Number Theory 2023-03-24 v3

Abstract

In any dimension d2d \geq 2, there is no known example of a low-discrepancy sequence which possess Poisssonian pair correlations. This is in some sense rather surprising, because low-discrepancy sequences always have β\beta-Poissonian pair correlations for all 0<β<1d0 < \beta < \tfrac{1}{d} and are therefore arbitrarily close to having Poissonian pair correlations (which corresponds to the case β=1d\beta = \tfrac{1}{d}). In this paper, we further elaborate on the closeness of the two notions. We show that dd-dimensional Kronecker sequences for badly approximable vectors α\vec{\alpha} with an arbitrary small uniformly distributed stochastic error term generically have β=1d\beta = \tfrac{1}{d}-Poissonian pair correlations.

Cite

@article{arxiv.2211.09891,
  title  = {The Pair Correlation Function of Multi-Dimensional Low-Discrepancy Sequences with Small Stochastic Error Terms},
  author = {Anja Schmiedt and Christian Weiß},
  journal= {arXiv preprint arXiv:2211.09891},
  year   = {2023}
}

Comments

Results have been generalized to arbitrary dimension

R2 v1 2026-06-28T06:09:58.555Z