The weakly coupled fractional one-dimensional Schr\"odinger operator with index 1<α ≤ 2

Abstract

We study fundamental properties of the fractional, one-dimensional Weyl operator Pα densely defined on the Hilbert space H=L2( R,dx) and determine the asymptotic behaviour of both the free Green's function and its variation with respect to energy for bound states. In the sequel we specify the Birman-Schwinger representation for the Schr\"odinger operator KαPα-g|V| and extract the finite-rank portion which is essential for the asymptotic expansion of the ground state. Finally, we determine necessary and sufficient conditions for there to be a bound state for small coupling constant g.