English

Supercritical Superprocesses: Proper Normalization and Non-degenerate Strong Limit

Probability 2018-10-19 v3

Abstract

Suppose that X={Xt,t0;Pμ}X=\{X_t, t\ge 0; \mathbb{P}_{\mu}\} is a supercritical superprocess in a locally compact separable metric space EE. Let ϕ0\phi_0 be a positive eigenfunction corresponding to the first eigenvalue λ0\lambda_0 of the generator of the mean semigroup of XX. Then Mt:=eλ0tϕ0,XtM_t:=e^{-\lambda_0t}\langle\phi_0, X_t\rangle is a positive martingale. Let MM_\infty be the limit of MtM_t. It is known (see, J. Appl. Probab. 46 (2009), 479--496) that MM_\infty is non-degenerate iff the LlogLL\log L condition is satisfied. In this paper we are mainly interested in the case when the LlogLL\log L condition is not satisfied. We prove that, under some conditions, there exist function γt\gamma_t on [0,)[0, \infty) and a non-degenerate random variable WW such that for any finite nonzero Borel measure μ\mu on EE, limtγtϕ0,Xt=W,\mboxa.s.Pμ. \lim_{t\to\infty}\gamma_t\langle \phi_0,X_t\rangle =W,\qquad\mbox{a.s.-}\mathbb{P}_{\mu}. We also give the almost sure limit of γtf,Xt\gamma_t\langle f,X_t\rangle for a class of general test functions ff.

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}
}
R2 v1 2026-06-22T21:14:54.491Z