Eigenvalue bounds for Schr\"odinger operators with complex potentials. III
Abstract
We discuss the eigenvalues Ej of Schr\"odinger operators -+V in L2( Rd) with complex potentials V∈ Lp, p<∞. We show that (A) Re Ej∞ implies Im Ej 0, and (B) Re Ej E∈ [0,∞) implies (Im Ej)∈q for some q depending on p. We prove quantitative versions of (A) and (B) in terms of the Lp-norm of V.
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