We introduce a probabilistic model that is meant to describe an object that falls apart randomly as time passes and fulfills a certain scaling property. We show that the distribution of such a process is determined by its index of self-similarity , a rate of erosion c⩾0, and a so-called Lévy measure that accounts for sudden dislocations. The key of the analysis is provided by a transformation of self-similar fragmentations which enables us to reduce the study to the homogeneous case α=0 which is treated in [6]
We provide the exact large-time behavior of the tail distribution of the extinction time of a self-s...
International audienceWe consider the height process of a Lévy process with no negative jumps, and i...
International audienceWe consider the fragmentation at nodes of the Lévy continuous random tree intr...
AbstractWe consider a self-similar fragmentation process which preserves the total mass. We are inte...
International audienceWe explore statistical inference in self-similar conservative fragmentation ch...
AbstractThis text surveys different probabilistic aspects of a model which is used to describe the e...
The purpose of this work is to define and study homogeneous fragmentation processes in continuous ti...
Abstract. We study a Markovian model for the random fragmentation of an object. At each time, the st...
30 pagesThe basic object we consider is a certain model of continuum random tree, called the stable ...
The main subject of this PHD thesis is the study of various quantities related to fragmentation proc...
32 pagesWe study a natural fragmentation process of the so-called stable tree introduced by Duquesne...
We study a Markovian model for the random fragmentation of an object. At each time, the state consis...
AbstractWe consider the height process of a Lévy process with no negative jumps, and its associated ...
Markovian growth-fragmentation processes describe a family of particles which can grow larger or sma...
We encode a certain class of stochastic fragmentation processes,namely self-similar fragmentation pr...
We provide the exact large-time behavior of the tail distribution of the extinction time of a self-s...
International audienceWe consider the height process of a Lévy process with no negative jumps, and i...
International audienceWe consider the fragmentation at nodes of the Lévy continuous random tree intr...
AbstractWe consider a self-similar fragmentation process which preserves the total mass. We are inte...
International audienceWe explore statistical inference in self-similar conservative fragmentation ch...
AbstractThis text surveys different probabilistic aspects of a model which is used to describe the e...
The purpose of this work is to define and study homogeneous fragmentation processes in continuous ti...
Abstract. We study a Markovian model for the random fragmentation of an object. At each time, the st...
30 pagesThe basic object we consider is a certain model of continuum random tree, called the stable ...
The main subject of this PHD thesis is the study of various quantities related to fragmentation proc...
32 pagesWe study a natural fragmentation process of the so-called stable tree introduced by Duquesne...
We study a Markovian model for the random fragmentation of an object. At each time, the state consis...
AbstractWe consider the height process of a Lévy process with no negative jumps, and its associated ...
Markovian growth-fragmentation processes describe a family of particles which can grow larger or sma...
We encode a certain class of stochastic fragmentation processes,namely self-similar fragmentation pr...
We provide the exact large-time behavior of the tail distribution of the extinction time of a self-s...
International audienceWe consider the height process of a Lévy process with no negative jumps, and i...
International audienceWe consider the fragmentation at nodes of the Lévy continuous random tree intr...