We study stochastic particle systems on a complete graph and derive effective mean-field rate equations in the limit of diverging system size, which are also known from cluster aggregation models. We establish the propagation of chaos under generic growth conditions on particle jump rates, and the limit provides a master equation for the single site dynamics of the particle system, which is a non-linear birth death chain. Conservation of mass in the particle system leads to conservation of the first moment for the limit dynamics, and to non-uniqueness of stationary distributions. Our findings are consistent with recent results on exchange driven growth, and provide a connection between the well studied phenomena of gelation and condensation
BACKGROUND: Many models used in theoretical ecology, or mathematical epidemiology are stochastic, an...
(Communicated by George Papanicolaou) Abstract. We study an interacting particle system whose dynami...
In this thesis we study the asymptotic behavior of particle systems in mean field type interaction i...
The article deals with the propagation of chaos for a system of interacting particles. Under suitabl...
We discuss mean-field theories for self-organized criticality and the connection with the general th...
135 pages; lecture notes for a course at the NDNS+ Applied Dynamical Systems Summer School ''Macrosc...
We present a method for solving population density equations (PDEs)–-a mean-field technique describi...
General birth-and-death as well as hopping stochastic dynamics of infinite particle systems in the c...
We present a novel method for solving population density equations (PDEs) - a mean field technique d...
We consider the forward Kolmogorov equation corresponding to measure-valued processes stemming from ...
AbstractWe consider a class of stochastic evolution models for particles diffusing on a lattice and ...
This thesis studies various problems related to the asymptotic behaviour and derivation of mean fiel...
International audienceIn the nonlinear diffusion framework, stochastic processes of McKean-Vlasov ty...
The thesis studies non-equilibrium stochastic particle systems, especially in the context of self-or...
Thesis (Ph.D.)--University of Washington, 2016-06The thesis concerns asymptotic behavior of particle...
BACKGROUND: Many models used in theoretical ecology, or mathematical epidemiology are stochastic, an...
(Communicated by George Papanicolaou) Abstract. We study an interacting particle system whose dynami...
In this thesis we study the asymptotic behavior of particle systems in mean field type interaction i...
The article deals with the propagation of chaos for a system of interacting particles. Under suitabl...
We discuss mean-field theories for self-organized criticality and the connection with the general th...
135 pages; lecture notes for a course at the NDNS+ Applied Dynamical Systems Summer School ''Macrosc...
We present a method for solving population density equations (PDEs)–-a mean-field technique describi...
General birth-and-death as well as hopping stochastic dynamics of infinite particle systems in the c...
We present a novel method for solving population density equations (PDEs) - a mean field technique d...
We consider the forward Kolmogorov equation corresponding to measure-valued processes stemming from ...
AbstractWe consider a class of stochastic evolution models for particles diffusing on a lattice and ...
This thesis studies various problems related to the asymptotic behaviour and derivation of mean fiel...
International audienceIn the nonlinear diffusion framework, stochastic processes of McKean-Vlasov ty...
The thesis studies non-equilibrium stochastic particle systems, especially in the context of self-or...
Thesis (Ph.D.)--University of Washington, 2016-06The thesis concerns asymptotic behavior of particle...
BACKGROUND: Many models used in theoretical ecology, or mathematical epidemiology are stochastic, an...
(Communicated by George Papanicolaou) Abstract. We study an interacting particle system whose dynami...
In this thesis we study the asymptotic behavior of particle systems in mean field type interaction i...