Sharp bounds for finitely many embedded eigenvalues of perturbed Stark type operators
Abstract
For perturbed Stark operators Hu=-u-xu+qu, the author has proved that x ∞x12|q(x)| must be larger than 12N12 in order to create N linearly independent eigensolutions in L2(R+). In this paper, we apply generalized Wigner-von Neumann type functions to construct embedded eigenvalues for a class of Schr\"odinger operators, including a proof that the bound 12N12 is sharp.
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