Conditional Log-Laplace Functionals of Immigration Superprocesses with Dependent Spatial Motion

Details Conditional Log-Laplace Functionals of Immigration Superprocesses with Dependent Spatial Motion Conditional Log-Laplace Functionals of Immigration Superprocesses with Dependent Spatial Motion

2006-06-24

arxiv.org/abs/math/0606622v1

Acta Applicandae Mathematicae 88 (2005), 2: 143-175

Mathematics

Probability

Scientific paper

A non-critical branching immigration superprocess with dependent spatial motion is constructed and characterized as the solution of a stochastic equation driven by a time-space white noise and an orthogonal martingale measure. A representation of its conditional log-Laplace functionals is established, which gives the uniqueness of the solution and hence its Markov property. Some properties of the superprocess including an ergodic theorem are also obtained.

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