Example of periodic Neumann waveguide with gap in spectrum

Abstract

In this note we investigate spectral properties of a periodic waveguide ( is a small parameter) obtained from a straight strip by attaching an array of -periodically distributed identical protuberances having "room-and-passage" geometry. In the current work we consider the operator A=-, where is the Neumann Laplacian in , the weight is equal to 1 everywhere except the union of the "rooms". We will prove that the spectrum of A has at least one gap as is small enough provided certain conditions on the weight and the sizes of attached protuberances hold. (Dedicated to Pavel Exner's 70th birthday)