We introduce a simple tree growth process that gives rise to a new two-parameter family of discrete fragmentation trees that extends Ford's alpha model to multifurcating trees and includes the trees obtained by uniform sampling from Duquesne and Le Gall's stable continuum random tree. We call these new trees the alpha-gamma trees. In this paper, we obtain their splitting rules, dislocation measures both in ranked order and in sized-biased order, and we study their limiting behaviour
Membres du Jury: Jean Bertoin, Jean-Francois Le Gall, Yves Le Jan, Yuval Peres (rapporteur), Alain R...
We introduce a recursive algorithm generating random trees, which we identify as skeletons of a cont...
This survey studies asymptotics of random fringe trees and extended fringe trees in random trees tha...
We introduce a simple tree growth process that gives rise to a new two-parameter family of discrete ...
We introduce a simple tree growth process that gives rise to a new two-parameter family of discrete ...
Given any regularly varying dislocation measure, we identify a natural self-similar fragmentation tr...
Given any regularly varying dislocation measure, we identify a natural self-similar fragmentation tr...
We consider a family of random trees satisfying a Markov branching property. Roughly, this property ...
Abstract. Given a general critical or sub-critical branching mechanism and its associated Lévy cont...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We study a fragmentation of the p-trees of Camarri and Pitman. We give exact correspondences between...
AbstractRandom splitting trees share the striking independence properties of the continuous time bin...
International audienceWe are interested in the dynamic of a structured branching population where th...
We consider two models of random continuous trees: Lévy trees and inhomogeneous continuum random tr...
Membres du Jury: Jean Bertoin, Jean-Francois Le Gall, Yves Le Jan, Yuval Peres (rapporteur), Alain R...
We introduce a recursive algorithm generating random trees, which we identify as skeletons of a cont...
This survey studies asymptotics of random fringe trees and extended fringe trees in random trees tha...
We introduce a simple tree growth process that gives rise to a new two-parameter family of discrete ...
We introduce a simple tree growth process that gives rise to a new two-parameter family of discrete ...
Given any regularly varying dislocation measure, we identify a natural self-similar fragmentation tr...
Given any regularly varying dislocation measure, we identify a natural self-similar fragmentation tr...
We consider a family of random trees satisfying a Markov branching property. Roughly, this property ...
Abstract. Given a general critical or sub-critical branching mechanism and its associated Lévy cont...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We study a fragmentation of the p-trees of Camarri and Pitman. We give exact correspondences between...
AbstractRandom splitting trees share the striking independence properties of the continuous time bin...
International audienceWe are interested in the dynamic of a structured branching population where th...
We consider two models of random continuous trees: Lévy trees and inhomogeneous continuum random tr...
Membres du Jury: Jean Bertoin, Jean-Francois Le Gall, Yves Le Jan, Yuval Peres (rapporteur), Alain R...
We introduce a recursive algorithm generating random trees, which we identify as skeletons of a cont...
This survey studies asymptotics of random fringe trees and extended fringe trees in random trees tha...