We describe a representation of the Bolthausen-Sznitman coalescent in terms of the cutting of random recursive trees. Using this representation, we prove results concerning the final collision of the coalescent restricted to [n]: we show that the distribution of the number of blocks involved in the final collision converges as n tends to infinity, and obtain a scaling law for the sizes of these blocks. We also consider the discrete-time Markov chain giving the number of blocks after each collision of the coalescent restricted to [n]; we show that the transition probabilities of the time-reversal of this Markov chain have limits as n tends to infinity. These results can be interpreted as describing a ``post-gelation'' phase of the Bolthausen...
This thesis is composed by three chapters and its main theme is branching processes.The first chapte...
For a finite measure Λ on [0, 1], the Λ-coalescent is a coalescent process such that, whenever there...
Regard an element of the set Δ := {(x1, x2, . . .): x1 ≥ x2 ≥ ⋯ ≥ 0, ∑i xi = 1} as a fragmentation o...
Coalescents with multiple collisions, also known as A-coalescents, were introduced by Pitman and Sag...
We comment on old and new results related to the destruction of a random recursive tree (RRT), in wh...
International audienceConsidering a random binary tree with $n$ labelled leaves, we use a pruning pr...
We introduce the multiplicative coalescent with linear deletion, a continuous-time Markov process de...
AbstractWe study the total branch length Ln of the Bolthausen–Sznitman coalescent as the sample size...
For each finite measure � on �0 � 1�, a coalescent Markov process, with state space the compact set ...
One major open conjecture in the area of critical random graphs, formulated by statistical physicist...
International audienceWe revisit the discrete additive and multiplicative coalescents, starting with...
Trees are a fundamental notion in graph theory and combinatorics as well as a basic object for data ...
Imagine a graph which is progressively destroyed by cutting its edges one after the other in a unifo...
Let (Bt(s), 0 ≤ s < ∞) be reflecting inhomogeneous Brownian motion with drift t - s at time s, st...
Regard an element of the set of ranked discrete distributions Δ := {(x1, x2,. . .) : x1 ≥ x2 ≥ . . ....
This thesis is composed by three chapters and its main theme is branching processes.The first chapte...
For a finite measure Λ on [0, 1], the Λ-coalescent is a coalescent process such that, whenever there...
Regard an element of the set Δ := {(x1, x2, . . .): x1 ≥ x2 ≥ ⋯ ≥ 0, ∑i xi = 1} as a fragmentation o...
Coalescents with multiple collisions, also known as A-coalescents, were introduced by Pitman and Sag...
We comment on old and new results related to the destruction of a random recursive tree (RRT), in wh...
International audienceConsidering a random binary tree with $n$ labelled leaves, we use a pruning pr...
We introduce the multiplicative coalescent with linear deletion, a continuous-time Markov process de...
AbstractWe study the total branch length Ln of the Bolthausen–Sznitman coalescent as the sample size...
For each finite measure � on �0 � 1�, a coalescent Markov process, with state space the compact set ...
One major open conjecture in the area of critical random graphs, formulated by statistical physicist...
International audienceWe revisit the discrete additive and multiplicative coalescents, starting with...
Trees are a fundamental notion in graph theory and combinatorics as well as a basic object for data ...
Imagine a graph which is progressively destroyed by cutting its edges one after the other in a unifo...
Let (Bt(s), 0 ≤ s < ∞) be reflecting inhomogeneous Brownian motion with drift t - s at time s, st...
Regard an element of the set of ranked discrete distributions Δ := {(x1, x2,. . .) : x1 ≥ x2 ≥ . . ....
This thesis is composed by three chapters and its main theme is branching processes.The first chapte...
For a finite measure Λ on [0, 1], the Λ-coalescent is a coalescent process such that, whenever there...
Regard an element of the set Δ := {(x1, x2, . . .): x1 ≥ x2 ≥ ⋯ ≥ 0, ∑i xi = 1} as a fragmentation o...