Absence of embedded eigenvalues for non-local Schrödinger operators.

We consider non-local Schrödinger operators with kinetic terms given by several different types of functions of the Laplacian and potentials decaying to zero at infinity and derive conditions ruling embedded eigenvalues out. Our goal in this paper is to advance techniques based on virial theorems, Mourre estimates, and an extended version of the Birman–Schwinger principle, previously developed for classical Schrödinger operators but thus far not used for non-local operators. We also present a number of specific cases by choosing particular classes of kinetic and potential terms and discuss existence/non-existence of at-edge eigenvalues in a basic model case in function of the coupling parameter. [ABSTRACT FROM AUTHOR]