English

Sample path properties of permanental processes

Probability 2017-11-06 v2

Abstract

Let Xα={Xα(t),tT}X_{\alpha}=\{X_{\alpha}(t),t\in T\}, α>0\alpha>0, be an α\alpha-permanental process with kernel u(s,t)u(s,t). We show that Xα1/2X^{1/2}_{\alpha} is a subgaussian process with respect to the metric σ(s,t)=(u(s,s)+u(t,t)2(u(s,t)u(t,s))1/2)1/2\sigma (s,t)= (u(s,s)+u(t,t)-2(u(s,t)u(t,s))^{1/2})^{1/2}. This allows us to use the vast literature on sample path properties of subgaussian processes to extend these properties to α\alpha-permanental processes. Local and uniform moduli of continuity are obtained as well as the behavior of the processes at infinity. Examples are given of permanental processes with kernels that are the potential density of transient L\'evy processes that are not necessarily symmetric, or with kernels of the form u^(x,y)=u(x,y)+f(y) \hat u(x,y)= u(x,y)+f(y), where uu is the potential density of a symmetric transient Borel right process and ff is an excessive function for the process.

Keywords

Cite

@article{arxiv.1708.09431,
  title  = {Sample path properties of permanental processes},
  author = {Michael B. Marcus and Jay Rosen},
  journal= {arXiv preprint arXiv:1708.09431},
  year   = {2017}
}
R2 v1 2026-06-22T21:28:22.097Z