Energy asymptotics of a Dirichlet to Neumann problem related to water waves

Abstract

We consider a Dirichlet to Neumann operator La arising in a model for water waves, with a nonlocal parameter a∈(-1,1). We deduce the expression of the operator in terms of the Fourier transform, highlighting a local behavior for small frequencies and a nonlocal behavior for large frequencies. We further investigate the -convergence of the energy associated to the equation La(u)=W'(u) , where W is a double-well potential. When a∈(-1,0] the energy -converges to the classical perimeter, while for a∈(0,1) the -limit is a new nonlocal operator, that in dimension n=1 interpolates the classical and the nonlocal perimeter.