AbstractWe show that random graphs in the preferential connectivity model have constant conductance, and hence have worst-case routing congestion that scales logarithmically with the number of nodes. Another immediate implication is constant spectral gap between the first and second eigenvalues of the random walk matrix associated with these graphs. We also show that the expected frugality (overpayment in the Vickrey–Clarke–Groves mechanism for shortest paths) of a sparse Erdős–Renyi random graph is bounded by a small constant
In this paper, we apply data mining analysis to study the topology of the Internet, thus creating a ...
I present a bound on the rate of convergence of random walks in graphs that depends upon the conduct...
We study transport properties such as electrical and frictionless flow conductance on scale-free and...
As the Intemet grows in size, it becomes crucial to understand bow the speeds of links in the networ...
Abstract: "As the Internet grows in size, it becomes crucial to understand how the speeds of links i...
As the Internet grows in size, it becomes crucial to understand how the speeds of links in the netwo...
The paper is concerned with the characterization of the relationship between topology and traffic dy...
We study transport properties such as conductance and diffusion of complex networks such as scale-fr...
We analyse a random graph where the node degrees are (almost) independent and have a distribution wi...
We study the large-scale topological and dynamical properties of real Internet maps at the autonomou...
Simplifying stochastic models of the topology of Internet have been studied intensively during the p...
In this article, we investigate an artificial traffic model on scale-free networks. Instead of using...
Random networks with power-law distribution of degrees of the nodes have been studied quite extensiv...
We study structural feature and evolution of the Internet at the autonomous systems level. Extractin...
In this paper, we apply data mining analysis to study the topology of the Internet, thus creating a ...
In this paper, we apply data mining analysis to study the topology of the Internet, thus creating a ...
I present a bound on the rate of convergence of random walks in graphs that depends upon the conduct...
We study transport properties such as electrical and frictionless flow conductance on scale-free and...
As the Intemet grows in size, it becomes crucial to understand bow the speeds of links in the networ...
Abstract: "As the Internet grows in size, it becomes crucial to understand how the speeds of links i...
As the Internet grows in size, it becomes crucial to understand how the speeds of links in the netwo...
The paper is concerned with the characterization of the relationship between topology and traffic dy...
We study transport properties such as conductance and diffusion of complex networks such as scale-fr...
We analyse a random graph where the node degrees are (almost) independent and have a distribution wi...
We study the large-scale topological and dynamical properties of real Internet maps at the autonomou...
Simplifying stochastic models of the topology of Internet have been studied intensively during the p...
In this article, we investigate an artificial traffic model on scale-free networks. Instead of using...
Random networks with power-law distribution of degrees of the nodes have been studied quite extensiv...
We study structural feature and evolution of the Internet at the autonomous systems level. Extractin...
In this paper, we apply data mining analysis to study the topology of the Internet, thus creating a ...
In this paper, we apply data mining analysis to study the topology of the Internet, thus creating a ...
I present a bound on the rate of convergence of random walks in graphs that depends upon the conduct...
We study transport properties such as electrical and frictionless flow conductance on scale-free and...