Some connections between discrepancy, finite gap properties, and pair correlations

Abstract: A generic uniformly distributed sequence $$(x_n)_{n \in \mathbb {N}}$$ ( x n ) n ∈ N in [0, 1) possesses Poissonian pair correlations (PPC). Vice versa, it has been proven that a sequence with PPC is unif… Show more

“…so that the case α = 1 corresponds to the usual pair correlation statistic, see also [Wei22] for an even more general notion. A sequence is said to have weak correlations if lim N →∞ F α N (s) = 2s for all s ≥ 0.…”

“…This connection of gaps and the pair correlation statistic partially explains the current popularity of the topic and has recently been very explicitly addressed in several publications, see e.g. [LS20], [Wei22] and [Wei23]. But also independently of the more specific pair correlation statistic, the gap structure of sequences in [0, 1] d is extensively explored in the literature, see e.g.…”

“…It has been generalized in many different regards, including e.g. to higher dimensions, see [HKL + 19], to weak pair correlations, see [NP07,HZ21] and below, to a combination of both, see [Wei22], to compact Riemannian manifolds, see [Mar19], and to higher order correlations, see [HZ23].…”

“…Due to a result which has been proved independently in [ALP18] and [GL17] for Poissonian pair correlations (i.e. α = 1) and which has been later generalized to weak pair correlations in [Ste18,Coh21,Wei22], we know that a sequence in [0, 1] with α-weak Poissonian pair correlations is uniformly distributed. This central property transfers to the p-adic integers as well.…”

“…Also here, most ingredients from the proof in the real case, see [GL17] and [Wei22], can be turned into precise arguments in the p-adic setting. Finally, we discuss the role of Kronecker sequences, which are to the author's knownledge the only known examples of sequences possessing the optimal order of convergence in terms of the p-adic discrepancy.…”

Sequences with almost Poissonian pair correlations

“…so that the case α = 1 corresponds to the usual pair correlation statistic, see also [Wei22] for an even more general notion. A sequence is said to have weak correlations if lim N →∞ F α N (s) = 2s for all s ≥ 0.…”

“…This connection of gaps and the pair correlation statistic partially explains the current popularity of the topic and has recently been very explicitly addressed in several publications, see e.g. [LS20], [Wei22] and [Wei23]. But also independently of the more specific pair correlation statistic, the gap structure of sequences in [0, 1] d is extensively explored in the literature, see e.g.…”

“…It has been generalized in many different regards, including e.g. to higher dimensions, see [HKL + 19], to weak pair correlations, see [NP07,HZ21] and below, to a combination of both, see [Wei22], to compact Riemannian manifolds, see [Mar19], and to higher order correlations, see [HZ23].…”

“…Due to a result which has been proved independently in [ALP18] and [GL17] for Poissonian pair correlations (i.e. α = 1) and which has been later generalized to weak pair correlations in [Ste18,Coh21,Wei22], we know that a sequence in [0, 1] with α-weak Poissonian pair correlations is uniformly distributed. This central property transfers to the p-adic integers as well.…”

“…Also here, most ingredients from the proof in the real case, see [GL17] and [Wei22], can be turned into precise arguments in the p-adic setting. Finally, we discuss the role of Kronecker sequences, which are to the author's knownledge the only known examples of sequences possessing the optimal order of convergence in terms of the p-adic discrepancy.…”

Sequences with almost Poissonian pair correlations

On Sequences With Exponentially Distributed Gaps

Deviation from equidistance for one-dimensional sequences