International audienceIt is known that random directed graphs undergo a phase transition around the point . Earlier, Łuczak and Seierstad have established that as when , the asymptotic probability that the strongly connected components of a random directed graph are only cycles and single vertices decreases from 1 to 0 as goes from to . By using techniques from analytic combinatorics, we establish the exact limiting value of this probability as a function of and provide more statistical insights into the structure of a random digraph around, below and above its transition point. We obtain the limiting probability that a random digraph is acyclic and the probability that it has one strongly connected complex component with a given difference...
In 2007, we introduced a general model of sparse random graphs with (conditional) independence betwe...
The weak component generalizes the idea of connected components to directed graphs. In this paper, a...
Given a simple directed graph D = (V,A), let the size of the largest induced acyclic tournament be d...
We consider some models of random graphs and directed graphs and investigate their behavior near thr...
Non-uniform hypergraphs appear in various domains of computer sci-ence as in the satisfiability prob...
We consider a random digraph Dn.uu, ln \ on vert ices l,..., n, where, lor each vertex r., we ch...
AbstractWe consider a random digraph Dα,β(n) with vertex set {1, 2, …, n} in which each vertex v ind...
Let P (n,M) be a graph chosen uniformly at random from the family of all labeled planar graphs with ...
We consider a model for random hypergraphs with identifiability, an analogue of connectedness. This ...
Abstract. We study the critical behavior of the random digraph D(n, p) for np = 1+ε, where ε = ε(n) ...
For a positive integer n and a real number p ? (0,1), a random directed acyclic digraph ?_{ac}(n,p) ...
We consider the near-critical Erdos-Rényi random graph G(n, p) and provide a new probabilistic proof...
We study site and bond percolation on directed simple random graphs with a given degree distribution...
Let H m(n) be a random graph on n vertices, grown by adding vertices one at a time, joining each new...
Let α ∈R, ε=(α+o(1)))/n and p=1/2(1+ε). Denote by {Mathematical expression} a random subgraph of the...
In 2007, we introduced a general model of sparse random graphs with (conditional) independence betwe...
The weak component generalizes the idea of connected components to directed graphs. In this paper, a...
Given a simple directed graph D = (V,A), let the size of the largest induced acyclic tournament be d...
We consider some models of random graphs and directed graphs and investigate their behavior near thr...
Non-uniform hypergraphs appear in various domains of computer sci-ence as in the satisfiability prob...
We consider a random digraph Dn.uu, ln \ on vert ices l,..., n, where, lor each vertex r., we ch...
AbstractWe consider a random digraph Dα,β(n) with vertex set {1, 2, …, n} in which each vertex v ind...
Let P (n,M) be a graph chosen uniformly at random from the family of all labeled planar graphs with ...
We consider a model for random hypergraphs with identifiability, an analogue of connectedness. This ...
Abstract. We study the critical behavior of the random digraph D(n, p) for np = 1+ε, where ε = ε(n) ...
For a positive integer n and a real number p ? (0,1), a random directed acyclic digraph ?_{ac}(n,p) ...
We consider the near-critical Erdos-Rényi random graph G(n, p) and provide a new probabilistic proof...
We study site and bond percolation on directed simple random graphs with a given degree distribution...
Let H m(n) be a random graph on n vertices, grown by adding vertices one at a time, joining each new...
Let α ∈R, ε=(α+o(1)))/n and p=1/2(1+ε). Denote by {Mathematical expression} a random subgraph of the...
In 2007, we introduced a general model of sparse random graphs with (conditional) independence betwe...
The weak component generalizes the idea of connected components to directed graphs. In this paper, a...
Given a simple directed graph D = (V,A), let the size of the largest induced acyclic tournament be d...