Asymptotic estimates for bound states in quantum waveguides coupled laterally through a narrow window

Abstract

Consider the Laplacian in a straight planar strip of width \,d\,, with the Neumann boundary condition at a segment of length \,2a\, of one of the boundaries, and Dirichlet otherwise. For small enough \,a\, this operator has a single eigenvalue \,ε(a)\,; we show that there are positive \,c1,c2\, such that \,-c1 a4 ε(a)- (π/ d)2 -c2 a4\,. An analogous conclusion holds for a pair of Dirichlet strips, of generally different widths, with a window of length \,2a\, in the common boundary.

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