Rigidity of determinantal point processes with the Airy, the Bessel and the Gamma kernel

Rigidity of determinantal point processes with the Airy, the Bessel and the Gamma kernel

A point process is said to be rigid if for any bounded domain in the phase space, the number of particles in the domain is almost surely determined by the restriction of the configuration to the complement of our bounded domain. The main result of this paper is that determinantal point processes wit...

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Veröffentlicht in:Bulletin of mathematical sciences 2016-04, Vol.6 (1), p.163-172
1. Verfasser: Bufetov, Alexander I.
Format: Artikel
Sprache:eng
Schlagworte:
Dynamical Systems
Mathematical Physics
Mathematics
Mathematics and Statistics
Physics
Probability
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Zusammenfassung:A point process is said to be rigid if for any bounded domain in the phase space, the number of particles in the domain is almost surely determined by the restriction of the configuration to the complement of our bounded domain. The main result of this paper is that determinantal point processes with the Airy, the Bessel and the Gamma kernels are rigid. The proof follows the scheme used by Ghosh, Ghosh and Peres: the main step is the construction of a sequence of additive statistics with variance going to zero.
ISSN:1664-3607
1664-3615
DOI:10.1007/s13373-015-0080-z