In this thesis, we establish the scaling limit of several models of random trees and graphs, enlarging and completing the now long list of random structures that admit David Aldous' continuum random tree (CRT) as scaling limit. Our results answer important open questions, in particular the conjecture by Aldous for the scaling limit of random unlabelled unrooted trees. We also show that random graphs from subcritical graph classes admit the CRT as scaling limit, proving (in a strong from) a conjecture by Marc Noy and Michael Drmota, who conjectured a limit for the diameter of these graphs. Furthermore, we provide a new proof for results by Bénédicte Haas and Grégory Miermont regarding the scaling limits of random Pólya trees, extending their...
37 pages, 7 figuresWe give alternate constructions of (i) the scaling limit of the uniform connected...
We consider a natural model of inhomogeneous random graphs that extends the classical Erdős–Rényi gr...
We develop a general universality technique for establishing metric scaling limits of critical rando...
In this thesis, we establish the scaling limit of several models of random trees and graphs, enlargi...
In this thesis we study random walks in random environments, a major area in Probability theory. Wit...
In this paper, we consider random plane forests uniformly drawn from all possible plane forests with...
This thesis is devoted to the study of different random graphs, defined by local properties (suchas ...
We show that the uniform unlabelled unrooted tree with n vertices and vertex degrees in a fixed set ...
We investigate scaling limits of several types of random trees. The study of scaling limits of rand...
We consider Galton--Watson trees conditioned on both the total number of vertices $n$ and the number...
We study a model of random R-enriched trees that is based on weights on the R-structures and allows ...
Nous nous intéressons à trois problèmes issus du monde des arbres aléatoires discrets et continus. D...
Abstract. We study the uniform random graph Cn with n vertices drawn from a subcritical class of con...
One major open conjecture in the area of critical random graphs, formulated by statistical physicist...
Trees are a fundamental notion in graph theory and combinatorics as well as a basic object for data ...
37 pages, 7 figuresWe give alternate constructions of (i) the scaling limit of the uniform connected...
We consider a natural model of inhomogeneous random graphs that extends the classical Erdős–Rényi gr...
We develop a general universality technique for establishing metric scaling limits of critical rando...
In this thesis, we establish the scaling limit of several models of random trees and graphs, enlargi...
In this thesis we study random walks in random environments, a major area in Probability theory. Wit...
In this paper, we consider random plane forests uniformly drawn from all possible plane forests with...
This thesis is devoted to the study of different random graphs, defined by local properties (suchas ...
We show that the uniform unlabelled unrooted tree with n vertices and vertex degrees in a fixed set ...
We investigate scaling limits of several types of random trees. The study of scaling limits of rand...
We consider Galton--Watson trees conditioned on both the total number of vertices $n$ and the number...
We study a model of random R-enriched trees that is based on weights on the R-structures and allows ...
Nous nous intéressons à trois problèmes issus du monde des arbres aléatoires discrets et continus. D...
Abstract. We study the uniform random graph Cn with n vertices drawn from a subcritical class of con...
One major open conjecture in the area of critical random graphs, formulated by statistical physicist...
Trees are a fundamental notion in graph theory and combinatorics as well as a basic object for data ...
37 pages, 7 figuresWe give alternate constructions of (i) the scaling limit of the uniform connected...
We consider a natural model of inhomogeneous random graphs that extends the classical Erdős–Rényi gr...
We develop a general universality technique for establishing metric scaling limits of critical rando...