arXiv:math/0512195 Abstract

arXiv:math/0512195 [math.PR]Abstract References Reviews Resources

Feller property and infinitesimal generator of the exploration process

Published 2005-12-09Version 1

We consider the exploration process associated to the continuous random tree (CRT) built using a Levy process with no negative jumps. This process has been studied by Duquesne, Le Gall and Le Jan. This measure-valued Markov process is a useful tool to study CRT as well as super-Brownian motion with general branching mechanism. In this paper we prove this process is Feller, and we compute its infinitesimal generator on exponential functionals and give the corresponding martingale.

Journal: Journal of Theoretical Probability 20 (2007) 355-370

DOI: 10.1007/s10959-007-0082-1

Categories: math.PR

Subjects: 60J35, 60J80, 60G57

Keywords: infinitesimal generator, exploration process, feller property, exponential functionals, levy process

Tags: journal article

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Feller property and infinitesimal generator of the exploration process

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Feller property and infinitesimal generator of the exploration process

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arXiv:math/0512195 [math.PR]Abstract References Reviews Resources