This paper formulates metric gravity in VBRC as a metric-language readout of the effective Hessian generated by the Part I core comparison density. The starting point is not a primitive Lorentzian manifold, a pre-given metric background, or an independently varied gravitational field. It is a retained-effective pair consisting of a retained variable and a licensed summary of unread content, together with the fixed VBRC comparison structure. When the R2 stability gate selects an effective background, the Hessian of the core functional carries principal-symbol and cone data from which a metric representative can be read. Only after this metric-readout gate has been passed do metric-language objects such as volume form, covariant derivative, curvature, and Einstein tensor become available. Geometry is therefore a readable representative of the stabilized comparison structure, not the primitive stage on which the theory is written. Lichnerowicz, retained-Schur, and summary-side dual-Schur constructions are then treated as readout views of the same effective Hessian. Under a locked-density subcase, the Lichnerowicz readout gives an Einstein-Hilbert principal display with an induced coupling coefficient. The resulting Einstein-form equation is a GR-locked comparison display, not an inserted starting axiom. Unread content affects the metric display only through licensed summaries and their derived readout footprints, never as raw matter.
Yi (Fri,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: