Eigenvalue bounds for Schr\"odinger operators with complex potentials. II
Abstract
Laptev and Safronov conjectured that any non-positive eigenvalue of a Schr\"odinger operator -+V in L2( R) with complex potential has absolute value at most a constant times \|V\|γ+/2(γ+/2)/γ for 0<γ≤/2 in dimension ≥ 2. We prove this conjecture for radial potentials if 0<γ</2 and we `almost disprove' it for general potentials if 1/2<γ</2. In addition, we prove various bounds that hold, in particular, for positive eigenvalues.
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