This work derives inertial mass as a fully emergent quantity from a closed quartic variational principle. Starting from the Universal Ψ Equation—an autonomous, parameter-free functional—we show that stable coherent extrema necessarily produce a positive-definite quadratic response under internal deformations. This curvature of the functional defines the inertial mass without introducing any mass parameter or external mechanism. The Hessian structure, the positivity of the second variation, and the collective-coordinate reduction lead to an effective inertial action of the form 12MeffX˙212 M₄₅₅ X²21MeffX˙2. Appendices provide the full Hessian, positivity proof, the emergence of a mass tensor, the equivalence of inertial and gravitational response, geodesic motion, the smooth-limit reduction to General Relativity, and the quantum fluctuation spectrum. Inertia therefore arises as a structural property of the variational extremum itself.
Livolsi Edoardo (Mon,) studied this question.