On continuous movement of the discrete spectrum of Schr\"odinger operators
Abstract
Continuous movement of discrete spectrum of the Schr\"odinger operator H(z)=-d2 dx2+V0+z V1, with ∫0∞ x |Vj(x)| dx < ∞, on the half-line is studied as z moves along a continuous path in the complex plane. The analysis provides information regarding the members of the discrete spectrum of the non-selfadjoint operator that are evolved from the discrete spectrum of the corresponding selfadjoint operator.
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