Effective delta sources and Newtonian limit in nonlocal gravity

Abstract

We investigate the Newtonian limit of a class of nonlocal gravity models with exponential form factors fs () = [(-/μs2)Ns]. Our main goal is to identify similarities and differences between models in this family in regard to weak-field solutions. To this end, we use the effective source formalism to compare the related effective delta sources, mass functions, and Newtonian potentials. We obtain a variety of representations for these quantities in terms of series, integrals, and special functions, as well as simple approximations that capture the relevant dependence on the parameters Ns and μs - which can be used to explore the weak-field phenomenology of nonlocal gravity. We explain why only for Ns>1 the Newtonian potential oscillates and prove that, despite the oscillations, the effective masses are positive. Moreover, we verify that these linearized solutions are regular (without curvature singularities). Finally, we also calculate the form of the leading logarithmic quantum correction to the Newtonian potential in these models. In all our considerations, we assume that Ns is a positive real parameter. The cases of non-integer Ns might be applied beyond nonlocal gravity, in effective approaches to implement quantum corrections in the weak field regime.

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