Generalizing Shell Theorem to Constant Curvature Spaces in All Dimensions and Topologies

Abstract

A gravitational potential has the spherical property when the field outside any uniform spherical shell is indistinguishable from that of a point mass at the center. We present the general potentials that possess this property on constant curvature spaces, using the Euler-Poisson-Darboux identity for spherical means. Our results are consistent with known findings in flat three-dimensional space and reduce to Gurzadyan's cosmological theorem when the rescaling factor is exactly 1. Our approach naturally extends to nontrivial spatial topologies.

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