Heteroclinic traveling waves of 1D parabolic systems with degenerate stable states

Abstract

We study the existence of traveling waves for the parabolic system equation ∂t w - ∂x2 w = -∇u W(w) in [0,+∞) × R equation where W is a potential bounded below and possessing two minima at different levels. We say that w is a traveling wave solution of the previous equation if there exist c>0 and u ∈ C2(R,Rk) such that w(t,x)=u(x-ct). For a class of potentials W, heteroclinic traveling waves of the previous equation where shown to exist by Alikakos and Katzourakis alikakos-katzourakis. More precisely, assuming the existence of two local minimizers of W at different levels which, in addition, satisfy some non-degeneracy assumptions, the authors in alikakos-katzourakis show the existence of a speed c>0 and profile u ∈ C2(R,Rk) such that u connects the two local minimizers at infinity. In this paper, we show that the non-degeneracy assumption on the local minima can be dropped and replaced by another one which allows for potentials possessing degenerate minima. As we do in oliver-bonafoux-tw, our main result is in fact proven for curves which take values in a general Hilbert space and the main result is deduced as a particular case, in the spirit of the earlier works by Monteil and Santambrogio monteil-santambrogio and Smyrnelis smyrnelis devoted to the existence of stationary heteroclinics.