Uniform resolvent estimates for critical magnetic Schr\"odinger operators in 2D
Abstract
We study the Lp-Lq-type uniform resolvent estimates for 2D-Schr\"odinger operators in scaling-critical magnetic fields, involving the Aharonov-Bohm model as a main example. As an application, we prove localization estimates for the eigenvalue of some non self-adjoint zero-order perturbations of the magnetic Hamiltonian.
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