On the Fractional Landis Conjecture

Abstract

In this paper we study a Landis-type conjecture for fractional Schr\"odinger equations of fractional power s∈(0,1) with potentials. We discuss both the cases of differentiable and non-differentiable potentials. On the one hand, it turns out for differentiable potentials with some a priori bounds, if a solution decays at a rate e-|x|1+, then this solution is trivial. On the other hand, for s∈(1/4,1) and merely bounded non-differentiable potentials, if a solution decays at a rate e-|x|α with α>4s/(4s-1), then this solution must again be trivial. Remark that when s 1, 4s/(4s-1) 4/3 which is the optimal exponent for the standard Laplacian. For the case of non-differential potentials and s∈(1/4,1), we also derive a quantitative estimate mimicking the classical result by Bourgain and Kenig.