On higher dimensional Poissonian pair correlation

Abstract

In this article we study the pair correlation statistic for higher dimensional sequences. We show that for any d≥ 2, strictly increasing sequences (an(1)),…, (an(d)) of natural numbers have metric Poissonian pair correlation with respect to sup-norm if their joint additive energy is O(N3-δ) for any δ>0. Further, in two dimension, we establish an analogous result with respect to 2-norm. As a consequence, it follows that (\nα\, \n2β\) and (\nα\, \[nAn]β\) (A ∈ [1,2]) have Poissonian pair correlation for almost all (α,β)∈ R2 with respect to sup-norm and 2-norm. This gives a negative answer to the question raised by Hofer and Kaltenb\"ock [15]. The proof uses estimates for 'Generalized' GCD-sums.

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