TY - JOUR
T1 - On Sequences With Exponentially Distributed Gaps
AU - Aistleitner, Christoph
AU - Hauke, Manuel
AU - Zafeiropoulos, Agamemnon
N1 - Publisher Copyright:
© 2024 The Author(s). Random Structures & Algorithms published by Wiley Periodicals LLC.
PY - 2025/1
Y1 - 2025/1
N2 - It is well known that a sequence (Formula presented.) which has Poissonian correlations of all orders necessarily has exponentially distributed nearest-neighbor gaps. It is natural to ask whether this implication also holds in the other direction, that is, whether a sequence with exponential gap distribution must have Poissonian correlations, and by an already known fact, must be equidistributed. We show that this assertion is generally false, by constructing a sequence that has exponential gap distribution but fails to be equidistributed (and as a consequence, also fails to have Poissonian correlations of any order and scale).
AB - It is well known that a sequence (Formula presented.) which has Poissonian correlations of all orders necessarily has exponentially distributed nearest-neighbor gaps. It is natural to ask whether this implication also holds in the other direction, that is, whether a sequence with exponential gap distribution must have Poissonian correlations, and by an already known fact, must be equidistributed. We show that this assertion is generally false, by constructing a sequence that has exponential gap distribution but fails to be equidistributed (and as a consequence, also fails to have Poissonian correlations of any order and scale).
KW - exponential gaps
KW - poissonian pair correlations
KW - uniform distribution
UR - http://www.scopus.com/inward/record.url?scp=85206834212&partnerID=8YFLogxK
U2 - 10.1002/rsa.21265
DO - 10.1002/rsa.21265
M3 - Article
AN - SCOPUS:85206834212
SN - 1042-9832
VL - 66
JO - Random Structures and Algorithms
JF - Random Structures and Algorithms
IS - 1
M1 - RSA21265
ER -