Large deviations and renormalization for Riesz potentials of stable intersection measures

Abstract

We study the object formally defined as γ([0,t]2)=∫∫[0,t]2 | Xs- Xr|-σ dr ds-E∫∫[0,t]2 | Xs- Xr|-σ dr ds, where Xt is the symmetric stable processes of index 0<β 2 in Rd. When βσ< \3 2β, d\, 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. This is applied to obtain results about stable processes in random potentials.