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We investigate the negative part of the spectrum of the operator -² - on L² (R), where a locally finite Radon measure 0 is serving as a potential. We obtain estimates for the eigenvalue counting function, for individual eigenvalues and estimates of the Lieb-Thirring type. A crucial tool for our estimates is Otelbaev's function, a certain average of the measure potential, which is used both in the proofs and the formulation of most of the results.
Fulsche et al. (Mon,) studied this question.