Strong-coupling asymptotic expansion for Schr\"odinger operators with a singular interaction supported by a curve in R3

Abstract

We investigate a class of generalized Schr\"odinger operators in L2(R3) with a singular interaction supported by a smooth curve . We find a strong-coupling asymptotic expansion of the discrete spectrum in case when is a loop or an infinite bent curve which is asymptotically straight. It is given in terms of an auxiliary one-dimensional Schr\"odinger operator with a potential determined by the curvature of . In the same way we obtain an asymptotics of spectral bands for a periodic curve. In particular, the spectrum is shown to have open gaps in this case if is not a straight line and the singular interaction is strong enough.

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