International audienceWe consider a class of stochastic processes modeling binary interactions in an N-particle system. Examples of such systems can be found in the modeling of biological swarms. They lead to the definition of a class of master equations that we call pair interaction driven master equations. We prove a propagation of chaos result for this class of master equations which generalizes Mark Kac's well know result for the Kac model in kinetic theory. We use this result to study kinetic limits for two biological swarm models. We show that propagation of chaos may be lost at large times and we exhibit an example where the invariant density is not chaotic
We deduce the kinetic equations describing the low density (and the large number of particles) limi...
We consider aN-particle model describing an alignment mechanism due to a topolog-ical interaction am...
The study of large interacting particle systems has broad applications in many scientific fields suc...
We consider a class of stochastic processes modeling binary interactions in an N-particle system. Ex...
International audienceWe consider a class of stochastic processes modeling binary interactions in an...
We consider two models of biological swarm behavior. In these models, pairs of particles interact to...
We consider systems of agents interacting through topological interactions. These have been shown to...
This thesis concerns various aspects of the Kac model. The Kac model is a Markov jump process for a ...
We consider the (kinetic) continuun limit for a clas of stochastic interacting particle systems. We ...
This paper is devoted to the study of propagation of chaos and mean-field limit for systems of indis...
We study a class of one-dimensional particle systems with true (Bird type) binary interactions, whic...
We consider the (kinetic) continuum limit for a class of stochastic interacting particle systems. We...
In this Note we present the main results from the recent work arxiv:1107.3251, which answers several...
The propagation of chaos is a central concept of kinetic theory that serves to relate the equations ...
The Kac model is a simplified model of an -particle system in which the collisions of a real particl...
We deduce the kinetic equations describing the low density (and the large number of particles) limi...
We consider aN-particle model describing an alignment mechanism due to a topolog-ical interaction am...
The study of large interacting particle systems has broad applications in many scientific fields suc...
We consider a class of stochastic processes modeling binary interactions in an N-particle system. Ex...
International audienceWe consider a class of stochastic processes modeling binary interactions in an...
We consider two models of biological swarm behavior. In these models, pairs of particles interact to...
We consider systems of agents interacting through topological interactions. These have been shown to...
This thesis concerns various aspects of the Kac model. The Kac model is a Markov jump process for a ...
We consider the (kinetic) continuun limit for a clas of stochastic interacting particle systems. We ...
This paper is devoted to the study of propagation of chaos and mean-field limit for systems of indis...
We study a class of one-dimensional particle systems with true (Bird type) binary interactions, whic...
We consider the (kinetic) continuum limit for a class of stochastic interacting particle systems. We...
In this Note we present the main results from the recent work arxiv:1107.3251, which answers several...
The propagation of chaos is a central concept of kinetic theory that serves to relate the equations ...
The Kac model is a simplified model of an -particle system in which the collisions of a real particl...
We deduce the kinetic equations describing the low density (and the large number of particles) limi...
We consider aN-particle model describing an alignment mechanism due to a topolog-ical interaction am...
The study of large interacting particle systems has broad applications in many scientific fields suc...