A fast solver for systems of reaction-diffusion equations

Abstract

In this paper we present a fast algorithm for the numerical solution of systems of reaction-diffusion equations, ∂t u + a · ∇ u = u + F (x, t, u), x ∈ ⊂ R3, t > 0. Here, u is a vector-valued function, u u(x, t) ∈ Rm, m is large, and the corresponding system of ODEs, ∂t u = F(x, t, u), is stiff. Typical examples arise in air pollution studies, where a is the given wind field and the nonlinear function F models the atmospheric chemistry.

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