Splitting schemes for hyperbolic heat conduction equation
Provides numerical methods for solving hyperbolic heat conduction problems, which are important for modeling rapid heat transfer processes.
The paper constructs additive splitting schemes for the hyperbolic heat conduction equation, proving unconditional stability for locally one-dimensional schemes and proposing new schemes for the temperature-heat flux system.
Rapid processes of heat transfer are not described by the standard heat conduction equation. To take into account a finite velocity of heat transfer, we use the hyperbolic model of heat conduction, which is connected with the relaxation of heat fluxes. In this case, the mathematical model is based on a hyperbolic equation of second order or a system of equations for the temperature and heat fluxes. In this paper we construct for the hyperbolic heat conduction equation the additive schemes of splitting with respect to directions. Unconditional stability of locally one-dimensional splitting schemes is established. New splitting schemes are proposed and studied for a system of equations written in terms of the temperature and heat fluxes.