We present a globally closed quartic variational framework constructed exclusively from a universal Psi--Gamma functional without externally imposed geometrical, quantum, or phenomenological structures. Starting directly from the exact variational principle, we derive the stationary variational sector, the full Hessian organization, the admissible configuration space, the recursive cyclic closure structure, and the global decisional selection functional governing admissible coherent configurations. The analysis demonstrates that the second variational sector generates a rigid spectral hierarchy characterized by one dominant coherent mode and a doubly degenerate recursive sector. This structure produces internally the three Livolsi constants: the universal structural constant \ (L=0. 25\), the global spectral scale \ (E^\), and the finite recursive constant \ (=1/96\). We further show that the framework generates an intrinsic recursive quantization hierarchy emerging directly from finite cyclic closure and admissible spectral organization, without introducing external quantization prescriptions. The work proves that quadratic structures are spectrally degenerate, cubic structures fail to generate stable recursive closure, purely local operators collapse the Hessian hierarchy, and externally completed extensions violate structural minimality. The quartic Psi--Gamma functional is consequently shown to define the unique globally closed variational structure within the admissible class of autosufficient, spectrally stable, recursively coherent, and internally closed functionals. All results follow directly from the internal variational organization of the framework without fitting procedures, externally imposed sectors, phenomenological corrections, or auxiliary assumptions.
Livolsi Edoardo (Mon,) studied this question.
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