Bound states of weakly deformed soft waveguides
Abstract
In this paper we consider the two-dimensional Schr\"odinger operator with an attractive potential which is a multiple of the characteristic function of an unbounded strip-shaped region, whose thickness is varying and is determined by the function R x d+ f(x), where d > 0 is a constant, > 0 is a small parameter, and f is a compactly supported continuous function. We prove that if ∫R f \,d x > 0, then the respective Schr\"odinger operator has a unique simple eigenvalue below the threshold of the essential spectrum for all sufficiently small >0 and we obtain the asymptotic expansion of this eigenvalue in the regime → 0. An asymptotic expansion of the respective eigenfunction as → 0 is also obtained. In the case that ∫R f \,d x < 0 we prove that the discrete spectrum is empty for all sufficiently small > 0. In the critical case ∫R f \,d x = 0, we derive a sufficient condition for the existence of a unique bound state for all sufficiently small > 0.
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