On the number of bound states for fractional Schr\"odinger operators with critical and super-critical exponent

Abstract

We study the number N<0(Hs) of negative eigenvalues, counting multiplicities, of the fractional Schr\"odinger operator Hs=(-)s-V(x) on L2(Rd), for any d1 and s d/2. We prove a bound on N<0(Hs) which depends on s-d/2 being either an integer or not, the critical case s=d/2 requiring a further analysis. Our proof relies on a splitting of the Birman-Schwinger operator associated to this spectral problem into low- and high-energies parts, a projection of the low-energies part onto a suitable subspace, and, in the critical case s=d/2, a Cwikel-type estimate in the weak trace ideal L2,∞ to handle the high-energies part.

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