We establish a rigorous arithmetic-to-geometric dictionary that bridges the Mahapatra-Dalvi-Collatz-(MDC-X) framework with the arithmetic geometry underlying Deligne’s proof of theRamanujan–Petersson conjecture. The MDC-X theorem derives a primordial topological invariant ∆(a) = 4 ln B(a) from the generalized Collatz map Ca,b(n), where B(a) =⌊(4/a)16⌋ emerges from the ergodic dissipation of the map via the Dalvi Dictact (local-to-globaltopological completion) over the minimal control layer m = 4.By casting the 16-block aggregated dissipation carrier into a 2-dimensional 2-adicGalois representation ρ2 : Gal(Q/Q) → GL2(Q2), we prove that the invariant ∆(3) =4 ln 99 appears as a stable eigenvalue parameter of the unramified Frobenius operator. Weshow that the local inverse Hecke Euler factor at the prime p = 2 is structurally isomorphicto the characteristic polynomial of the renormalized inverse carrier operator Φ˜ R. This yields an explicit identification of the Hecke eigenvalue a2 and the weight k in terms ofthe integer base B(a). For the dissipative multiplier a = 3, the equation 2k−1 = 99 hasno integer solution, demonstrating that the corresponding Galois representation is notmodular – a spectral signature of the dissolution of the Collatz conjecture.We analyze the expansive regime a ≥ 5, where EX = ln(a/4) > 0 leads to B(a) = 0and the collapse of the Hecke-L function correspondence. A non-Archimedean Banachspace intertwining operator T : C(Z2, Q2) → C(Z2, Q2) is constructed, whose Fredholmdeterminant recovers the integer base B(a) as its spectral pole, and the uniform 2-adicdistribution P(k = j) = 2−jemerges as the unique invariant Haar measure.This integration completes the ontological hierarchy: number theory (the MDC-Xmap) determines topology (Galois representations), which in turn dictates geometry(modular forms and their bounds). The constant π and the rigid constraints of automorphic forms are not primitive; they are emergent consequences of the dissipativenecessity of pure arithmetic.
Dillip Kumar Mahapatra (Sat,) studied this question.
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