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We propose a counterpart of the classical Rollnik-class of potentials for fractional and massive relativistic Laplacians, and describe this space in terms of appropriate Riesz potentials. These definitions rely on precise resolvent estimates. We show that Coulomb-type potentials are elements of fractional Rollnik-class up to but not including the critical singularity of the Hardy potential. For the operators with fractional exponent = 1 there exists no fractional Rollnik potential, however, in low dimensions we make sense of these classes as limiting cases by using -convergence. In a second part of the paper we derive detailed results on the self-adjointness and spectral properties of relativistic Schr\"odinger operators obtained under perturbations by fractional Rollnik potentials. We also define an extended fractional Rollnik-class which is the maximal space for the Hilbert-Schmidt property of the related Birman-Schwinger operators.
Ascione et al. (Tue,) studied this question.