Existence and energy estimates of weak solutions for nonlocal Cahn--Hilliard equations on unbounded domains

Abstract

This paper considers the initial-boundary value problem for the nonlocal Cahn--Hilliard equation ∂t + (-+1)(a(·) -J + G'()) = 0 in\ ×(0, T) in an unbounded domain ⊂ RN with smooth bounded boundary, where N∈N, T>0, and a(·), J, G are given functions. In the case that is a bounded domain and -+1 is replaced with -, this problem has been studied by using a Faedo--Galerkin approximation scheme considering the compactness of the Neumann operator -+1 (cf. Colli--Frigeri--Grasselli (2012), Gal--Grasselli (2014)). However, the compactness of the Neumann operator -+1 breaks down when is an unbounded domain. The present work establishes existence and energy estimates of weak solutions for the above problem on an unbounded domain.