Add to ORKGIn this paper, we first define a deterministic particle model for heat conduction. It consists of a chain of N identical subsystems, each of which contains a scatterer and with particles moving among these scatterers. Based on this model, we then derive heuristically, in the limit of N → ∞ and decreasing scattering cross-section, a Boltzmann equation for this limiting system. This derivation is obtained by a closure argument based on memory loss between collisions. We then prove that the Boltzmann equation has, for stochastic driving forces at the boundary, close to Maxwellians, a unique non-equilibrium steady stat
none6noWe consider the problem of describing the dynamics of a test particle moving in a thermal bat...
This paper gives a rigorous derivation of a new stochastic particle method for the Boltzmann equatio...
The main results of my work contribute to the mathematical study of microscopic non-equilibrium syst...
In this paper, we first define a deterministic particle model for heat conduction. It consists of a ...
Abstract: In this paper, we first define a deterministic particle model for heat conduc-tion. It con...
We study heat transport in a one-dimensional chain of a finite number N of identical cells, coupled ...
We study heat transport in a one-dimensional chain of a finite number N of identical cells, coupled ...
We study heat transport in a one-dimensional chain of a finite number N of identical cells, coupled ...
This paper introduces a new method to show the validity of a continuum description for the determini...
We study the nonequilibrium state of heat conduction in a one-dimensional system of hard point parti...
In the context of the problem of heat conduction in one-dimensional systems, we present an analytica...
We study the problem of optimizing released heat or dissipated work in stochastic thermodynamics. I...
We show that a regularized stationary Boltzmann equation with diffusive boundary conditions can be r...
We consider a stochastic heat conduction model for solids composed by N interacting atoms. The syste...
We consider nonequilibrium transport in a simple chain of identical mechanical cells in which partic...
none6noWe consider the problem of describing the dynamics of a test particle moving in a thermal bat...
This paper gives a rigorous derivation of a new stochastic particle method for the Boltzmann equatio...
The main results of my work contribute to the mathematical study of microscopic non-equilibrium syst...
In this paper, we first define a deterministic particle model for heat conduction. It consists of a ...
Abstract: In this paper, we first define a deterministic particle model for heat conduc-tion. It con...
We study heat transport in a one-dimensional chain of a finite number N of identical cells, coupled ...
We study heat transport in a one-dimensional chain of a finite number N of identical cells, coupled ...
We study heat transport in a one-dimensional chain of a finite number N of identical cells, coupled ...
This paper introduces a new method to show the validity of a continuum description for the determini...
We study the nonequilibrium state of heat conduction in a one-dimensional system of hard point parti...
In the context of the problem of heat conduction in one-dimensional systems, we present an analytica...
We study the problem of optimizing released heat or dissipated work in stochastic thermodynamics. I...
We show that a regularized stationary Boltzmann equation with diffusive boundary conditions can be r...
We consider a stochastic heat conduction model for solids composed by N interacting atoms. The syste...
We consider nonequilibrium transport in a simple chain of identical mechanical cells in which partic...
none6noWe consider the problem of describing the dynamics of a test particle moving in a thermal bat...
This paper gives a rigorous derivation of a new stochastic particle method for the Boltzmann equatio...
The main results of my work contribute to the mathematical study of microscopic non-equilibrium syst...