On pair correlation and discrepancy
Abstract
We say that a sequence \xn\n ≥ 1 in [0,1) has Poissonian pair correlations if equation* N → ∞ 1N \# \ 1 ≤ l ≠ m ≤ N \, : \, xl-xm < sN \ = 2s equation* for all s>0. In this note we show that if the convergence in the above expression is - in a certain sense - fast, then this implies a small discrepancy for the sequence \xn\n ≥ 1. As an easy consequence it follows that every sequence with Poissonian pair correlations is uniformly distributed in [0,1).
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