Existence of heteroclinic solution for a double well potential equation in an infinite cylinder of RN

Abstract

This paper concernes with the existence of heteroclinic solutions for the following class of elliptic equations -u+A(ε x, y)V'(u)=0, in , where ε >0, = × is an infinite cylinder of RN with N ≥ 2. Here, we have considered a large class of potential V that includes the Ginzburg-Landau potential V(t)=(t2-1)2 and two geometric conditions on the function A. In the first condition we assume that A is asymptotic at infinity to a periodic function, while in the second one A satisfies 0<A0=A(0,y)=∈f(x,y) ∈ A(x,y) < |(x,y)| +∞A(x,y)=A∞<∞, ∀ y ∈ .