English

Dunkl jump processes: relaxation and a phase transition

Mathematical Physics 2021-05-20 v4 math.MP Probability

Abstract

Dunkl processes are multidimensional Markov processes defined through the use of Dunkl operators. These processes have discontinuities, and they can be separated into their continuous (radial) part, and their discontinuous (jump) part. While radial Dunkl processes have been studied thoroughly due to their relationship to families of stochastic particle systems such as the Dyson model and Wishart-Laguerre processes, Dunkl jump processes have gone largely unnoticed after the initial work of Gallardo, Yor and Chybiryakov. We study the dynamical properties of these processes, and we derive their master equation. By calculating the asymptotic behavior of their total jump rate, we find that the jump processes of types AN1A_{N-1} and BNB_N undergo a phase transition when the parameter β\beta decreases toward one in the bulk scaling limit. In addition, we show that the relaxation behavior of these processes is given by a non-trivial power law, and formulate a conjecture for the jump rate asymptotics based on numerical simulations.

Keywords

Cite

@article{arxiv.1805.07755,
  title  = {Dunkl jump processes: relaxation and a phase transition},
  author = {Sergio Andraus},
  journal= {arXiv preprint arXiv:1805.07755},
  year   = {2021}
}

Comments

30 pages, 1 figure

R2 v1 2026-06-23T02:01:53.178Z