On Landis' conjecture in the plane for potentials with growth

Abstract

We investigate the quantitative unique continuation properties of real-valued solutions to Schr\"odinger equations in the plane with potentials that exhibit growth at infinity. More precisely, for equations of the form u - V u = 0 in R2, with |V(z)| |z|N for some N 0, we prove that real-valued solutions satisfy exponential decay estimates with a rate that depends explicitly on N. The case N = 0 corresponds to the Landis conjecture, which was proved for real-valued solutions in the plane in [LMNN20]. As such, the results in this article may be interpreted as generalized Landis-type theorems. Our proof techniques rely heavily on the ideas presented in [LMNN20].