Gibbs Ensembles of Nonintersecting Paths
Mathematical Physics
2015-05-13 v1 math.MP
Abstract
We consider a family of determinantal random point processes on the two-dimensional lattice and prove that members of our family can be interpreted as a kind of Gibbs ensembles of nonintersecting paths. Examples include probability measures on lozenge and domino tilings of the plane, some of which are non-translation-invariant. The correlation kernels of our processes can be viewed as extensions of the discrete sine kernel, and we show that the Gibbs property is a consequence of simple linear relations satisfied by these kernels. The processes depend on infinitely many parameters, which are closely related to parametrization of totally positive Toeplitz matrices.
Keywords
Cite
@article{arxiv.0804.0564,
title = {Gibbs Ensembles of Nonintersecting Paths},
author = {Alexei Borodin and Senya Shlosman},
journal= {arXiv preprint arXiv:0804.0564},
year = {2015}
}
Comments
6 figures