- Equations aux derivees partielles / Partial Differential Equations Existence globale pour l'equation de Smoluchowski continue
- ON SELECTION DYNAMICS FOR CONTINUOUS STRUCTURED POPULATIONS
- On self-similarity and stationary problem for fragmentation and coagulation models
- On a discrete Boltzmann-Smoluchowski Equation with rates bounded in the velocity variables
- An inverse solution to Kac's program in mean-field theory
- Equations aux derivees partielles / Partial Differential Equations Convergence to the equilibrium for the Pauli equation
- ENTROPY MAXIMISATION PROBLEM QUANTUM AND RELATIVISTIC PARTICLES
- UNIVERSITE DE VERSAILLES SAINT-QUENTIN DEPARTEMENT DE MATHEMATIQUES
- ASYMPTOTIC DESCRIPTION OF DIRAC MASS FORMATION
- FROM THE BECKER-DORING TO THE LIFSHITZ-SLYOZOV-WAGNER EQUATIONS Philippe Laurencot1
- A NEW APPROACH TO QUANTITATIVE CHAOS PROPAGATION ESTIMATES FOR DRIFT, DIFFUSION AND
- Sur le programme de Kac (concernant les limites de champ moyen)
- ON THE TRACE PROBLEM FOR SOLUTIONS OF THE VLASOV EQUATION
- General relative entropy inequality: an illustration on growth Philippe Michel 1,2
- Cooling process for inelastic Boltzmann equations for hard spheres, Part I: The Cauchy problem
- ON THE INITIAL BOUNDARY VALUE PROBLEM FOR THE VLASOV-POISSON-BOLTZMANN SYSTEM.
- Trend to equilibrium for discrete coagulation equations with strong fragmentation and without balance condition
- Stability in a Nonlinear Population Maturation Model Stephane Mischler
- Mecanismos de crecimiento: desde el modelaje hasta el analisis matematico Stephane Mischler
- Quantitative and Uniform in time Chaos Convergence for N-particle system to its
- GLOBAL EXISTENCE FOR THE DISCRETE DIFFUSIVE COAGULATION-FRAGMENTATION EQUATIONS IN L1
- KINETIC EQUATIONS WITH MAXWELL BOUNDARY CONDITION Stephane MISCHLER
- THE CONTINUOUS COAGULATION-FRAGMENTATION EQUATIONS WITH DIFFUSION
- GELATION IN COAGULATION AND FRAGMENTATION MODELS
- CONVERGENCE TO EQUILIBRIUM FOR THE CONTINUOUS COAGULATION-FRAGMENTATION EQUATION
- ON A KINETIC EQUATION FOR COALESCING PARTICLES Miguel Escobedo1
- A Boltzmann equation for elastic, inelastic and coalescing Nicolas Fournier1
- LIAPUNOV FUNCTIONALS FOR SMOLUCHOWSKI'S COAGULATION EQUATION
- Cooling process for inelastic Boltzmann equations for hard spheres, Part II: Self-similar solutions and
- UPERIEURESORMALENECOLE Dpartement de mathmatiques et applications
- Proceedings of the Royal Society of Edinburgh, 138A, 67107, 2008 Singular solutions for
- Qualitative properties of some Boltzmann like equations which do not fulfill a detailed balance condition
- Kinetic equations with Maxwell boundary conditions S. Mischler1
- Chaos and Statistical solutions S. Mischler
- Cours de l'Ecole doctorale EDDIMO : Estimation quantitative et uniforme en temps de la
- ON THE CONVERGENCE OF NUMERICAL SCHEMES FOR THE BOLTZMANN EQUATION
- FROM THE DISCRETE TO THE CONTINUOUS COAGULATION-FRAGMENTATION EQUATIONS
- Equations aux derivees partielles / Partial Differential Equations Equation de Boltzmann quantique homog`ene
- Electronic Journal of Differential Equations, Monogrpah 04, 2003. ISSN: 1072-6691. URL: http://ejde.math.swt.edu or http://ejde.math.unt.edu
- Universite de Versailles Saint-Quentin Departement de MATHEMATIQUES
- Dust and self-similarity for the Smoluchowski coagulation M. Escobedo1
- Universite de Versailles Saint-Quentin Departement de MATHEMATIQUES
- Preserving hypocoercivity when enlarging the space setting for linear PDE and applications
- Kac's program in kinetic theory S. Mischler
