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Article Dans Une Revue Electronic Journal of Probability Année : 2004

The genealogy of self-similar fragmentations with negative index as a continuum random tree

Résumé

We encode a certain class of stochastic fragmentation processes,namely self-similar fragmentation processes with a negative indexof self-similarity, into a metric family tree which belongs to thefamily of Continuum Random Trees of Aldous. When the splittingtimes of the fragmentation are dense near 0, the tree can in turnbe encoded into a continuous height function, just as the BrownianContinuum Random Tree is encoded in a normalized Brownianexcursion. Under mild hypotheses, we then compute the Hausdorffdimensions of these trees, and the maximal Hölder exponents ofthe height functions.
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Dates et versions

hal-00000995 , version 1 (05-01-2004)

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Benedicte Haas, Gregory Miermont. The genealogy of self-similar fragmentations with negative index as a continuum random tree. Electronic Journal of Probability, 2004, 9, pp.57-97. ⟨hal-00000995⟩
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