Trace Asymptotics for Fractional Schrodinger Operators

Abstract

This paper proves an analogue of a result of Banuelos and Sa Barreto on the asymptotic expansion for the trace of Schrodinger operators on d when the Laplacian , which is the generator of the Brownian motion, is replaced by the non-local integral operator α/2, 0<α<2, which is the generator of the symmetric stable process of order α. These results also extend recent results of Banuelos and Yildirim where the first two coefficients for α/2 are computed. Some extensions to Schrodinger operators arising from relativistic stable and mixed stable processes are obtained.