The Q-series develops the exchange-cycle and closure structure of scalar–conformal NUVO systems. Starting from closed exchange cycles, admissible return conditions, and geometric transport defects, the series shows how discrete closure states arise from holonomic compatibility rather than from externally imposed quantum postulates.
A major purpose of the Q-series is to connect scalar–conformal transport geometry to familiar quantum-scale phenomena. The series develops closure action, the emergence of a universal action scale, dynamic-loop transport, hydrogenic closure structure, spectral transitions, matter-wave coherence, transport-derived phase, and ultimately a Schrödinger-type representation arising from deterministic closure dynamics.
The Q-series therefore serves as NUVO’s bridge from geometric exchange transport to quantized structure. It interprets quantization, spectra, phase, and matter-wave behavior as consequences of closure compatibility and scalar transport coherence, while preserving the view that wavefunctions and operator formalisms are emergent representations rather than foundational assumptions.
00 Planck Units Relation
01 Exchange Cycle Action and Structural Closure in Scalar--Conformal NUVO Systems
02 Closure Law and Admissible Return Structure in Scalar--Conformal NUVO Systems
03 Hydrogenic Closure Scales and Atomic Length Structure in Scalar--Conformal NUVO Systems
04 Closure Action and the Emergence of a Universal Transport Scale in Scalar–Conformal NUVO Systems
05 Closure Action and the Energy–Frequency Law in Scalar–Conformal NUVO Systems
06 Propagating Dynamic Loops
07 The Hydrogen Spectrum from Exchange-Cycle Closure in Scalar--Conformal NUVO Systems
08 Transport of Closure States and Interaction Coherence in Scalar--Conformal NUVO Systems
09 Matter-Wave Coherence from Exchange in Scalar--Conformal NUVO Systems
10 Scalar Transport and Coherent Phase Evolution in Scalar--Conformal NUVO Systems
11 Unified Transport Law for Closure and Exchange in Scalar--Conformal NUVO Systems
12 Emergent Schrödinger Representation from Transport Closure in Scalar–Conformal NUVO Systems
13 Closure-Density Curvature and the Madelung Form of Transport Closure in Scalar–Conformal NUVO Systems