Carleman estimates and absence of embedded eigenvalues
arXiv:math-ph/0508052 · doi:10.1007/s00220-006-0060-y
Abstract
Let L be a Schroedinger operator with potential W in L^{(n+1)/2}. We prove that there is no embedded eigenvalue. The main tool is an Lp Carleman type estimate, which builds on delicate dispersive estimates established in a previous paper. The arguments extend to variable coefficient operators with long range potentials and with gradient potentials.
26 pages