Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Pareschi, Lorenzo - Dipartimento di Matematica, Università di Ferrara
Asymptotic Preserving Monte Carlo Methods for the Boltzmann Equation
TOWARDS A HYBRID MONTE CARLO METHOD FOR RAREFIED GAS DYNAMICS
Time Relaxed Monte Carlo methods for the Boltzmann equation
Lattice-Boltzmann type relaxation systems and high order relaxation schemes for the incompressible
A precise computation of stress intensity factor on the front of a convex planar crack
Fast Spectral Methods for the Fokker-Planck-Landau Collision Operator
SPECTRAL METHODS FOR THE NON CUT-OFF BOLTZMANN EQUATION AND NUMERICAL GRAZING COLLISION LIMIT
A recursive Monte Carlo method for the Boltzmann equation in the Maxwellian case
Hyperbolic Relaxation Approximation to Nonlinear Parabolic Problems
Central schemes for hydrodynamical limits of discretevelocity kinetic models
M ethode spectrale rapide pour l' equation de Fokker-Planck-Landau
NUMERICAL SOLUTION OF THE BOLTZMANN EQUATION I: SPECTRALLY ACCURATE APPROXIMATION
Discretization of the Multiscale Semiconductor Boltzmann Equation by Di usive Relaxation Schemes
NUMERICAL SCHEMES FOR HYPERBOLIC SYSTEMS OF CONSERVATION LAWS WITH STIFF DIFFUSIVE RELAXATION
An Implicit Monte Carlo Method for Rarefied Gas Dynamics I: The Space Homogeneous Case.
IMPLICIT-EXPLICIT RUNGE-KUTTA SCHEMES FOR STIFF SYSTEMS OF DIFFERENTIAL EQUATIONS
On the stability of spectral methods for the homogeneous Boltzmann equation
Central di erencing based numerical schemes for hyperbolic conservation laws with relaxation terms
A numerical method for the accurate solution of the Fokker-Planck-Landau equation in the non homogeneous case
Characteristicbased numerical schemes for hyperbolic systems with nonlinear relaxation
