Some negative results related to Poissonian pair correlation problems

Abstract: We say that a sequence (xn) n∈N in [0, 1) has Poissonian pair correlations iffor every s ≥ 0. The aim of this article is twofold. First, we will establish a gap theorem which allows to deduce that a sequence (xn) n∈N of real numbers in [0, 1) having a certain weak gap structure, cannot have Poissonian pair correlations. This result covers a broad class of sequences, e.g., Kronecker sequences, the van der Corput sequence and in more general LS-sequences of points and digital (t, 1)-sequences. Additionally, this… Show more

“…The result was already proven by the first author for d = 1 in a previous work, see [9]. This case can also be recovered by Theorem 1 in [10].…”

Pair correlation of sequences with maximal additive energy

“…The result was already proven by the first author for d = 1 in a previous work, see [9]. This case can also be recovered by Theorem 1 in [10].…”

Pair correlation of sequences with maximal additive energy

“…In fact, a deeper investigation reveals that the Three-Gap-Theorem is indeed a valid argument to deduce the result on the PPC strucuture of the Kronecker sequence. It is an immediate consequence of the following theorem, which was proven in [18], in combination with the Three-Gap-Theorem. Theorem 1.…”

“…However, it was shown by Pirsic and Stockinger in [22], that for α the Champernowne number, the sequence ({2 n α}) n≥1 does not have PPC. Also for further concrete examples like Stoneham-numbers or infinite de Bruijn-words, the sequence ({2 n α}) n≥1 does not have PPC (see [18]).…”

7. On pair correlation of sequences

“…Note that the other direction is not necessarily correct. For instance the Kronecker sequence ({nα}) n∈N , does not have this property for any real α; a fact that can be argued by a continued fractions argument or by the main theorem in [12] in combination with the famous Three Gap Theorem, see [17]. Poissonian pair correlation is a typical property of a sequence.…”

The Champernowne constant is not Poissonian