Water-waves modes trapped in a canal by a body with the rough surface

Abstract

The problem about a body in a three dimensional infinite channel is considered in the framework of the theory of linear water-waves. The body has a rough surface characterized by a small parameter ε>0 while the distance of the body to the water surface is also of order ε. Under a certain symmetry assumption, the accumulation effect for trapped mode frequencies is established, namely, it is proved that, for any given d>0 and integer N>0, there exists ε(d,N)>0 such that the problem has at least N eigenvalues in the interval (0,d) of the continuous spectrum in the case ε∈(0,ε(d,N)) . The corresponding eigenfunctions decay exponentially at infinity, have finite energy, and imply trapped modes.