Eigenvalue asymptotics for strong δ-interactions supported on curves with corners

Abstract

Let ⊂R2 be a piecewise smooth closed curve with corners. We discuss the asymptotic behavior of the individual eigenvalues of the two-dimensional Schr\"odinger operator --αδ for α∞, where δ is the Dirac δ-distribution supported by . It is shown that the asymptotics of several first eigenvalues is determined by the corner opening only, while the main term in the asymptotic expansion for the other eigenvalues is the same as for smooth curves. Under an additional assumption on the corners of (which is satisfied, in particular, if has no acute corners), a more detailed eigenvalue asymptotics is established in terms of a one-dimensional effective operator on the boundary.

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