Supercritical Superprocesses: Proper Normalization and Non-degenerate Strong Limit
Probability
2018-10-19 v3
Abstract
Suppose that is a supercritical superprocess in a locally compact separable metric space . Let be a positive eigenfunction corresponding to the first eigenvalue of the generator of the mean semigroup of . Then is a positive martingale. Let be the limit of . It is known (see, J. Appl. Probab. 46 (2009), 479--496) that is non-degenerate iff the condition is satisfied. In this paper we are mainly interested in the case when the condition is not satisfied. We prove that, under some conditions, there exist function on and a non-degenerate random variable such that for any finite nonzero Borel measure on , We also give the almost sure limit of for a class of general test functions .
Cite
@article{arxiv.1708.04422,
title = {Supercritical Superprocesses: Proper Normalization and Non-degenerate Strong Limit},
author = {Yan-Xia Ren and Renming Song and Rui Zhang},
journal= {arXiv preprint arXiv:1708.04422},
year = {2018}
}