Abstract
Dissipative kinetic models inspired by neutron transport are studied in a (1+1)-dimensional context: first, in the two-stream approximation, then in the general case of continuous velocities. Both are known to relax, in the diffusive scaling, toward a damped heat equation. Accordingly, it is shown that "uniformly accurate" L-splines discretizations of this parabolic asymptotic equation emerge from well-balanced schemes involving scattering S-matrices for the kinetic models. Moreover, well-balanced properties are shown to be preserved when applying IMEX time-integrators in the diffusive scaling. Numerical tests confirm these theoretical findings.
Anno
2020
Autori IAC
Tipo pubblicazione
Altri Autori
Gabriella Bretti; Laurent Gosse; Nicolas Vauchelet
Editore
National Centre for Natural Science and Technology & Vietnamese Mathematics Society ; [poi] Springer Singapore
Rivista
Vietnam journal of mathematics (Online)
