AbstractFor labeled trees, Rényi showed that the probability that an arbitrary point of a random tree has degree k approaches l/e(k−l)!. For unlabeled trees, the answer is different because the number of ways to label a given tree depends on the order of its automorphism group. Using arguments involving combinatorial enumeration and asymptotics, we evaluate the corresponding probabilities for large unlabeled trees
Abstract. Let Tn denote the set of unrooted labeled trees of size n and let M be a particular (finit...
In a 2-parameter scale free model of random graphs it is shown that the asymptotic degree distributi...
We develop a combinatorial structure to serve as model of random real world networks. Starting with ...
For labeled trees, Renyi showed that the probability that an arbitrary point of a random tree has de...
AbstractFor labeled trees, Rényi showed that the probability that an arbitrary point of a random tre...
AbstractMapping patterns may be represented by unlabelled directed graphs in which each point has ou...
By means of an asymptotic analysis of generating functions, we determine the limiting distribution o...
Local convergence of bounded degree graphs was introduced by Benjamini and Schramm. This result was ...
We study the fundamental question of how likely it is that two randomly chosen trees are isomorphic ...
We show that the probability that two randomly chosen trees are isomorphic decays exponentially for ...
We introduce a family of probability distributions on the space of trees with I labeled vertices and...
Two types of random trees, "static" and "growing," are studied. The "growing" type of trees is const...
AbstractWe prove that for each k⩾0, the probability that a root vertex in a random planar graph has ...
We prove that for each k ≥ 0, the probability that a root vertex in a random planar graph has degree...
In this article, we explicitly derive the limiting degree distribution of the shortest path tree fro...
Abstract. Let Tn denote the set of unrooted labeled trees of size n and let M be a particular (finit...
In a 2-parameter scale free model of random graphs it is shown that the asymptotic degree distributi...
We develop a combinatorial structure to serve as model of random real world networks. Starting with ...
For labeled trees, Renyi showed that the probability that an arbitrary point of a random tree has de...
AbstractFor labeled trees, Rényi showed that the probability that an arbitrary point of a random tre...
AbstractMapping patterns may be represented by unlabelled directed graphs in which each point has ou...
By means of an asymptotic analysis of generating functions, we determine the limiting distribution o...
Local convergence of bounded degree graphs was introduced by Benjamini and Schramm. This result was ...
We study the fundamental question of how likely it is that two randomly chosen trees are isomorphic ...
We show that the probability that two randomly chosen trees are isomorphic decays exponentially for ...
We introduce a family of probability distributions on the space of trees with I labeled vertices and...
Two types of random trees, "static" and "growing," are studied. The "growing" type of trees is const...
AbstractWe prove that for each k⩾0, the probability that a root vertex in a random planar graph has ...
We prove that for each k ≥ 0, the probability that a root vertex in a random planar graph has degree...
In this article, we explicitly derive the limiting degree distribution of the shortest path tree fro...
Abstract. Let Tn denote the set of unrooted labeled trees of size n and let M be a particular (finit...
In a 2-parameter scale free model of random graphs it is shown that the asymptotic degree distributi...
We develop a combinatorial structure to serve as model of random real world networks. Starting with ...