Add to ORKGWe consider a class of continuous phase coexistence models in three spatial dimensions. The fluctuations are driven by symmetric stationary random fields with sufficient integrability and mixing conditions, but not necessarily Gaussian.We show that, in the weakly nonlinear regime, if the external potential is a symmetric polynomial and a certain average of it exhibits pitchfork bifurcation, then these models all rescale to $$\Phi ^4_3$$ near their critical point
The asymptotic behavior of coupled Langevin equations in the limit of weak noise is studied by gener...
Different microscopic models exhibiting self-organized criticality are studied numerically and analy...
In three-dimensional O(N) models, we investigate the low-momentum behavior of the two-point Green's ...
We study a class of three-dimensional continuous phase coexistence models, and show that, under diff...
We study a class of three dimensional continuous phase coexistence models, and show that, under diff...
We extend the theory of quasipotentials in dynamical systems by calculating, within a broad class of...
Phase transitions in non-equilibrium steady states of O(n)-symmetric models with reversible mode co...
We extend the weak universality of KPZ in [HQ18] to weakly asymmetric interface models with general ...
This work is devoted to the study of relaxation--dissipation processes in systems described by Quant...
We present a comparative study of several dynamical systems of increasing complexity, namely, the lo...
We study a (generalized) globally coupled system whose elements are two-dimensional chaotic maps, an...
We investigate the effect of self-propulsion on a mean-field order-disorder transition. Starting fro...
International audienceWe investigate the stationary-state fluctuations of a growing one-dimensional ...
Abstract. We review our work on a discrete model of stochastic, phase-coupled oscillators that is su...
For systems of partial differential equations (PDEs) with locally cubic nonlinearities, which are pe...
The asymptotic behavior of coupled Langevin equations in the limit of weak noise is studied by gener...
Different microscopic models exhibiting self-organized criticality are studied numerically and analy...
In three-dimensional O(N) models, we investigate the low-momentum behavior of the two-point Green's ...
We study a class of three-dimensional continuous phase coexistence models, and show that, under diff...
We study a class of three dimensional continuous phase coexistence models, and show that, under diff...
We extend the theory of quasipotentials in dynamical systems by calculating, within a broad class of...
Phase transitions in non-equilibrium steady states of O(n)-symmetric models with reversible mode co...
We extend the weak universality of KPZ in [HQ18] to weakly asymmetric interface models with general ...
This work is devoted to the study of relaxation--dissipation processes in systems described by Quant...
We present a comparative study of several dynamical systems of increasing complexity, namely, the lo...
We study a (generalized) globally coupled system whose elements are two-dimensional chaotic maps, an...
We investigate the effect of self-propulsion on a mean-field order-disorder transition. Starting fro...
International audienceWe investigate the stationary-state fluctuations of a growing one-dimensional ...
Abstract. We review our work on a discrete model of stochastic, phase-coupled oscillators that is su...
For systems of partial differential equations (PDEs) with locally cubic nonlinearities, which are pe...
The asymptotic behavior of coupled Langevin equations in the limit of weak noise is studied by gener...
Different microscopic models exhibiting self-organized criticality are studied numerically and analy...
In three-dimensional O(N) models, we investigate the low-momentum behavior of the two-point Green's ...