This paper presents the axiomatic core of La Profilée (LP) in compact form. It derives, from minimal admissibility conditions, the necessary structural architecture of any persistence system under real transformation: the Frame–Module–Coupling decomposition, the persistence law IR = R/ (F·M·K) ≤ 1, the identity-continuity condition FCC, the Q1/Q2 independence theorem, the primary regime-space, and the universal sub-regime structure. LP begins from four primitive terms and three minimal conditions. From these it derives six theorems establishing: the necessity of the F·M·K architecture, the multiplicative form of integration capacity, the necessity of the Frame-deviation threshold δF, the exhaustion of the primary regime-space into three real regimes, the reduction of all persistence theories to LP conditions, and LP as the minimal structural law of persistence. The exhaustion of alternative coherent persistence structures — trivialization, indeterminacy, structural equivalence — is derived in Section 10. 1. Six universal sub-regimes are derived: Flourishing, Fragile Persistence, Directed Transmutation, Drift Transmutation, Collapse, and Dissolution. These constitute the minimal universal structural partition currently derivable within the LP admissibility architecture. Full formal proofs — including the Persistence Admissibility Theorem (PAT) with Lemmas 1–4 and the Closure Theorem — are in P162. Domain-specific extensions build on these foundations.
Marc Maibom (Sun,) studied this question.
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