Front propagation directed by a line of fast diffusion: large diffusion and large time asymptotics

TL;DR

This paper investigates how a line of fast diffusion influences the spread of a reaction-diffusion system in a strip, revealing a new transition phenomenon and extending previous results to more general nonlinearities.

Contribution

It proves that the invasion speed is enhanced by fast diffusion even with nonlinearities that prevent explicit calculations, and identifies a new transition phenomenon.

Findings

Invasion speed increases with fast diffusion coefficient.

A new transition phenomenon in the spreading behavior.

Extension of previous results to nonlinearities beyond logistic cases.

Abstract

The system under study is a reaction-diffusion equation in a horizontal strip, coupled to a diffusion equation on its upper boundary via an exchange condition of the Robin type. This class of models was introduced by H. Berestycki, L. Rossi and the second author in order to model biological invasions directed by lines of fast diffusion. They proved, in particular, that the speed of invasion was enhanced by a fast diffusion on the line, the spreading velocity being asymptotically proportional to the square root of the fast diffusion coefficient. These results could be reduced, in the logistic case, to explicit algebraic computations. The goal of this paper is to prove that the same phenomenon holds, with a different type of nonlinearity, which precludes explicit computations. We discover a new transition phenomenon, that we explain in detail.