English

Large deviations and renormalization for Riesz potentials of stable intersection measures

Probability 2009-10-20 v1

Abstract

We study the object formally defined as \gamma\big([0,t]^{2}\big)=\int\int_{[0,t]^{2}} | X_{s}- X_{r}|^{-\sigma} dr ds-E\int\int_{[0,t]^{2}} | X_{s}- X_{r}|^{-\sigma} dr ds, where XtX_{t} is the symmetric stable processes of index 0<β20<\beta\le 2 in RdR^{d}. When βσ<min{32β,d}\beta\le\sigma<\displaystyle\min \Big\{{3\over 2}\beta, d\Big\}, this has to be defined as a limit, in the spirit of renormalized self-intersection local time. We obtain results about the large deviations and laws of the iterated logarithm for γ\gamma. This is applied to obtain results about stable processes in random potentials.

Keywords

Cite

@article{arxiv.0910.3371,
  title  = {Large deviations and renormalization for Riesz potentials of stable intersection measures},
  author = {Xia Chen and Jay Rosen},
  journal= {arXiv preprint arXiv:0910.3371},
  year   = {2009}
}
R2 v1 2026-06-21T13:59:48.820Z