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arxiv: 2001.02078 · v5 · pith:QO6NWK5Gnew · submitted 2020-01-02 · ⚛️ physics.gen-ph

Static Einstein-Scalar Reconstruction: Compatibility and Descent

classification ⚛️ physics.gen-ph
keywords scalarcompatibilitypotentialstaticcriteriondescenteinstein-scalarfunction
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Prescribing both the areal-radius metric function $F(r)$ and the scalar profile $\phi(r)$ generally overdetermines static Einstein-scalar reconstruction. The temporal and radial Einstein equations determine a redshift function and an algebraic radial source $V_{\mathrm{alg}}(r)$, but do not by themselves impose the angular equation or guarantee a single-valued scalar potential. On a connected static interval we formulate the corresponding membership criterion for independently prescribed pairs: a potential-independent residual $\mathcal{C}[F,\phi]$ must vanish, and $V_{\mathrm{alg}}$ must descend across the full scalar image to one branch-independent $C^1$ potential, with stationarity at values attained on constant-profile intervals. The compatibility and descent requirements are independent. As a positive benchmark, the criterion recovers the logarithmic Matos-Guzm\'an-N\'u\~nez scalar halo with its exponential potential. At a radially regular center we compute the leading scalar backreaction on $F$. Applied to a rational kink profile with rational curvature interpolation, exact compatibility forces the scalar amplitude to vanish for every integer $n\geq2$, giving an ansatz-specific compatibility obstruction rather than a no-hair or classification theorem.

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