Infinite random matrices and ergodic measures
Mathematical Physics
2009-10-31 v1 math.MP
Probability
Representation Theory
Abstract
We introduce and study a 2-parameter family of unitarily invariant probability measures on the space of infinite Hermitian matrices. We show that the decomposition of a measure from this family on ergodic components is described by a determinantal point process on the real line. The correlation kernel for this process is explicitly computed. At certain values of parameters the kernel turns into the well-known sine kernel which describes the local correlation in Circular and Gaussian Unitary Ensembles. Thus, the random point configuration of the sine process is interpreted as the random set of ``eigenvalues'' of infinite Hermitian matrices distributed according to the corresponding measure.
Cite
@article{arxiv.math-ph/0010015,
title = {Infinite random matrices and ergodic measures},
author = {Alexei Borodin and Grigori Olshanski},
journal= {arXiv preprint arXiv:math-ph/0010015},
year = {2009}
}
Comments
36 pages