Add to ORKGWe consider an individual-based model where agents interact over a random network via first-order dynamics that involve both attraction and repulsion. In the case of all-to-all coupling of agents in Rd this system has a lowest energy state in which an equal number of agents occupy the vertices of the d -dimensional simplex. The purpose of this paper is to sharpen and extend a line of work initiated in [56], which studies the behavior of this model when the interaction between the N agents occurs according to an Erdős–Rényi random graph G(N, p) instead of all-to-all coupling. In particular, we study the effect of randomness on the stability of these simplicial solutions, and provide rigorous results to demonstrate that stability of these sol...
This thesis deals with four models of stochastic dynamics on relevant large finite systems. The firs...
© 2020, Institute of Mathematical Statistics. All rights reserved. This paper introduces the Attract...
In the past 20 years network science has proven its strength in modeling many real-world interacting...
We consider an individual-based model where agents interact over a random network via first-order dy...
Abstract We consider a compromise model in one dimension in which pairs of agents interact through f...
We study how the structure of the interaction graph of a game affects the existence of pure Nash equ...
We study the phase diagram of the standard pair approximation equations for two different models in ...
We analyze dynamic local interaction in population games where the local interaction structure (mode...
We analyze the stability of linear dynamical systems defined on sparse, random graphs with predator-...
We analyze dynamic local interaction in population games where the local interaction structure (mode...
We study the behavior of solutions of mutually coupled equations in het-erogeneous random graphs. He...
Abstract: The stage of evolution is the population of reproducing individuals. The structure of the ...
This introduction to some of the principal models in the theory of disordered systems leads the read...
In this paper we study the cooperative behavior of agents playing the Prisoner’s Dilemma game in ran...
Abstract Swarming behaviour is a type of bacterial motility that has been found to be dependent on r...
This thesis deals with four models of stochastic dynamics on relevant large finite systems. The firs...
© 2020, Institute of Mathematical Statistics. All rights reserved. This paper introduces the Attract...
In the past 20 years network science has proven its strength in modeling many real-world interacting...
We consider an individual-based model where agents interact over a random network via first-order dy...
Abstract We consider a compromise model in one dimension in which pairs of agents interact through f...
We study how the structure of the interaction graph of a game affects the existence of pure Nash equ...
We study the phase diagram of the standard pair approximation equations for two different models in ...
We analyze dynamic local interaction in population games where the local interaction structure (mode...
We analyze the stability of linear dynamical systems defined on sparse, random graphs with predator-...
We analyze dynamic local interaction in population games where the local interaction structure (mode...
We study the behavior of solutions of mutually coupled equations in het-erogeneous random graphs. He...
Abstract: The stage of evolution is the population of reproducing individuals. The structure of the ...
This introduction to some of the principal models in the theory of disordered systems leads the read...
In this paper we study the cooperative behavior of agents playing the Prisoner’s Dilemma game in ran...
Abstract Swarming behaviour is a type of bacterial motility that has been found to be dependent on r...
This thesis deals with four models of stochastic dynamics on relevant large finite systems. The firs...
© 2020, Institute of Mathematical Statistics. All rights reserved. This paper introduces the Attract...
In the past 20 years network science has proven its strength in modeling many real-world interacting...