In this work, we analyze the properties of two-particle correlations in the weak-coupling and plasma limit of interacting particle systems motivated by Bogolyubov's formal derivation of kinetic equations. We prove that the leading order evolution in the weak-coupling scaling limit is stable on the macroscopic timescale, and yields the nonlinear Landau equation as kinetic equation. This result shows the transition from the non-Markovian dynamics of the interacting particle system to the Markovian, parabolic evolution in the kinetic limit. Since the system is non-dissipative before taking the limit, we introduce a time-averaged notion of stability to derive an a priori estimate on the solution. Moreover, we prove the global stability of the t...
Friesen M, Kondratiev Y. WEAK-COUPLING LIMIT FOR ERGODIC ENVIRONMENTS. METHODS OF FUNCTIONAL ANALYSI...
We provide a detailed multiscale analysis of a system of particles interacting through a dynamical n...
We consider a system of N classical particles, interacting via a smooth, short-range potential, in a...
Starting from a system of N particles at a microscopic scale, we describe different scaling limits w...
We study well-posedness and long time behavior of the nonlinear Vlasov-Poisson- Fokker-Planck system...
The limits of scaled relative entropies between probability distributions associated with $N$-partic...
The two-particle correlations in a turbulent plasma are analyzed on a quite general basis by using t...
The spreading of correlations after a quantum quench is studied in a wide class of lattice systems, ...
89 pagesIn this paper we review the formal derivation of different classes of kinetic equations for ...
This is a short survey on recent results obtained by the authors on dynamical phase transitions of i...
A large system of particles is studied. Its time evolution is determined as the superposition of two...
AbstractWe consider a system of interacting Ornstein–Uhlenbeck particles moving in a d-dimensional t...
In this thesis we will study a system of Brownian particles on the real line, which are coupled thro...
We deduce the kinetic equations describing the low density (and the large number of particles) limi...
135 pages; lecture notes for a course at the NDNS+ Applied Dynamical Systems Summer School ''Macrosc...
Friesen M, Kondratiev Y. WEAK-COUPLING LIMIT FOR ERGODIC ENVIRONMENTS. METHODS OF FUNCTIONAL ANALYSI...
We provide a detailed multiscale analysis of a system of particles interacting through a dynamical n...
We consider a system of N classical particles, interacting via a smooth, short-range potential, in a...
Starting from a system of N particles at a microscopic scale, we describe different scaling limits w...
We study well-posedness and long time behavior of the nonlinear Vlasov-Poisson- Fokker-Planck system...
The limits of scaled relative entropies between probability distributions associated with $N$-partic...
The two-particle correlations in a turbulent plasma are analyzed on a quite general basis by using t...
The spreading of correlations after a quantum quench is studied in a wide class of lattice systems, ...
89 pagesIn this paper we review the formal derivation of different classes of kinetic equations for ...
This is a short survey on recent results obtained by the authors on dynamical phase transitions of i...
A large system of particles is studied. Its time evolution is determined as the superposition of two...
AbstractWe consider a system of interacting Ornstein–Uhlenbeck particles moving in a d-dimensional t...
In this thesis we will study a system of Brownian particles on the real line, which are coupled thro...
We deduce the kinetic equations describing the low density (and the large number of particles) limi...
135 pages; lecture notes for a course at the NDNS+ Applied Dynamical Systems Summer School ''Macrosc...
Friesen M, Kondratiev Y. WEAK-COUPLING LIMIT FOR ERGODIC ENVIRONMENTS. METHODS OF FUNCTIONAL ANALYSI...
We provide a detailed multiscale analysis of a system of particles interacting through a dynamical n...
We consider a system of N classical particles, interacting via a smooth, short-range potential, in a...