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 is the symmetric stable processes of index in . When , 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 . This is applied to obtain results about stable processes in random potentials.
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}
}