Weak field and slow motion limits in energy-momentum powered gravity

Abstract

We explore the weak field and slow motion limits, Newtonian and Post-Newtonian limits, of the energy-momentum powered gravity (EMPG), viz., the energy-momentum squared gravity (EMSG) of the form f(TμTμ)=α (TμTμ)η with α and η being constants. We have shown that EMPG with η≥0 and general relativity (GR) are not distinguishable by local tests, say, the Solar System tests; as they lead to the same gravitational potential form, PPN parameters, and geodesics for the test particles. However, within the EMPG framework, M ast, the mass of an astrophysical object inferred from astronomical observations such as planetary orbits and deflection of light, corresponds to the effective mass M eff(α,η,M)=M+M empg(α,η,M), M being the actual physical mass and M empg being the modification due to EMPG. Accordingly, while in GR we simply have the relation M ast=M, in EMPG we have M ast=M+M empg. Within the framework of EMPG, if there is information about the values of \α,η\ pair or M from other independent phenomena (from cosmological observations, structure of the astrophysical object, etc.), then in principle it is possible to infer not only M ast alone from astronomical observations, but M and M empg separately. For a proper analysis within EMPG framework, it is necessary to describe the slow motion condition (also related to the Newtonian limit approximation) by |p eff/ eff|1 (where p eff=p+p empg and eff=+ empg), whereas this condition leads to |p/|1 in GR.