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The Fractal Character of Localizable Measure-Valued Processes, II. Localizable Processes and Backward Trees

✍ Scribed by U. Zähle

Publisher
John Wiley and Sons
Year
1988
Tongue
English
Weight
597 KB
Volume
137
Category
Article
ISSN
0025-584X

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Regard a large population of infinitesimal particles (i.e. measures) in the case, when the particles evolve (i.e. move, branch, die) independently of each other. Those evolutions we callcd localizable. In the present part of this paper we study branching diffusion processes, which result from high f

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In part II the evolation of large popnfationa of infinitesimal particles is stadied, in which one can follow the path of m y particle snfviviag up to bime t. To construct the diatribution of the totality of these pathsthe so-called backward tree -, we need a general extension theorem for random meas