Nonstandard discretizations of the generalized Nagumo reaction-diffusion equation

A finite volume method for the convection-diffusion-reaction equation is presented, which is a model equation in combustion theory. This method is combined with an exponential scheme for the computation of the fluxes. We prove that the numerical fluxes are second-order accurate, uniformly in the loc

A Lie group approach is adopted to construct generalized Pinney equations of two distinct types which admit nonlinear superposition principles. The procedure also provides a route to discretizations of these Pinney equations which preserves the property of admittance of a nonlinear superposition pri

In this paper we derive diffusive relaxation schemes for the linear semiconductor Boltzmann equation that work in both the kinetic and diffusive regimes. Similar to our earlier approach for multiscale transport equations, we use the even-and oddparity formulation of the kinetic equation, and then re

The method of generalized quasi-linearization has been well developed for ordinary differential equations. In this paper, we extend the method of generalized quasi-linearization to reaction diffusion equations on an unbounded domain. The iterates, which are solutions of linear equations starting fro