English

Large deviations for intersection measures of some Markov processes

Probability 2018-05-22 v1

Abstract

Consider an intersection measure tIS\ell_t ^{\mathrm{IS}} of pp independent (possibly different) mm-symmetric Hunt processes up to time tt in a metric measure space EE with a Radon measure mm. We derive a Donsker-Varadhan type large deviation principle for the normalized intersection measure tptISt^{-p}\ell_t ^{\mathrm{IS}} on the set of finite measures on EE as tt \rightarrow \infty, under the condition that tt is smaller than life times of all processes. This extends earlier work by W. K\"onig and C. Mukherjee (2013), in which the large deviation principle was established for the intersection measure of pp independent NN-dimensional Brownian motions before exiting some bounded open set DRND \subset \mathbb{R}^N. We also obtain the asymptotic behaviour of logarithmic moment generating function, which is related to the results of X. Chen and J. Rosen (2005) on the intersection measure of independent Brownian motions or stable processes. Our results rely on assumptions about the heat kernels and the 1-order resolvents of the processes, hence include rich examples. For example, the assumptions hold for pZp\in \mathbb{Z} with 2p<p2\leq p < p_* when the processes enjoy (sub-)Gaussian type or jump type heat kernel estimates, where pp_* is determined by the Hausdorff dimension of EE and the so-called walk dimensions of the processes.

Keywords

Cite

@article{arxiv.1805.07945,
  title  = {Large deviations for intersection measures of some Markov processes},
  author = {Takahiro Mori},
  journal= {arXiv preprint arXiv:1805.07945},
  year   = {2018}
}

Comments

53 pages

R2 v1 2026-06-23T02:02:24.161Z