Min-Max formulae for the speeds of pulsating travelling fronts in periodic excitable media

Abstract

This paper is concerned with some nonlinear propagation phenomena for reaction-advection-diffusion equations in a periodic framework. It deals with travelling wave solutions of the equation ut =∇·(A(z)∇ u) +q(z)·∇ u+ f(z,u), t ∈ R, z ∈ , propagating with a speed c. In the case of a "combustion" nonlinearity, the speed c exists and it is unique, while the front u is unique up to a translation in t. We give a - and a - formula for this speed c. On the other hand, in the case of a "ZFK" or a "KPP" nonlinearity, there exists a minimal speed of propagation c*. In this situation, we give a - formula for c*. Finally, we apply this - formula to prove a variational formula involving eigenvalue problems for the minimal speed c* in the "KPP" case.