Imbedded singular continuous spectrum for Schrödinger operators
Authors:
Alexander Kiselev
Affiliation:
Department of Mathematics, University of Wisconsin, Madison, Wisconsin 53706-1388
Abstract:
We construct examples of potentials satisfying where the function is growing arbitrarily slowly, such that the corresponding Schrödinger operator has an imbedded singular continuous spectrum. This solves one of the fifteen ``twenty-first century" problems for Schrödinger operators posed by Barry Simon. The construction also provides the first example of a Schrödinger operator for which Möller wave operators exist but are not asymptotically complete due to the presence of a singular continuous spectrum. We also prove that if the singular continuous spectrum is empty. Therefore our result is sharp.