The M-series establishes the mathematical and structural foundation of the NUVO program. It begins with scalar–conformal geometry, in which physical spacetime is represented by a Lorentzian manifold equipped with a scalar modulation field that determines the conformal metric structure. From this starting point, the series develops the canonical NUVO equation, the interpretation of scalar capacity availability, and the sectoral organization of support, exchange, radiation, and structural response.
A central role of the M-series is to define the primitive ontology of NUVO systems. Persistent structures are modeled through anchored or bundled loop configurations, while exchange processes are treated through open-loop and dynamic-loop structures. The support sector describes how persistent structures are sustained by boundary flux and capacity delivery, whereas the exchange sector describes transport, coupling, radiative propagation, and weak-limit field behavior.
Together, the M-series functions as the backbone of the NUVO framework. It fixes the geometric language, the scalar-field interpretation, the loop taxonomy, the support/exchange distinction, and the structural principles needed for later developments in relativistic kinematics, quantization, bound-state closure, and quantum-mechanical correspondence.
m0 Foundational Ontology and Structural Definitions of Scalar–Conformal NUVO Systems
m1 Scalar–Conformal Geometry and the Canonical NUVO Equation
m2 Structural Capacity Availability and the Interpretation of the Canonical NUVO Equation
m3 Gravitational Reduction of the Canonical NUVO Equation
m3-5 Effective Scalar Modulation and Orbital Transport on Scalar–Conformal NUVO Space
m4 The Canonical Exchange Sector on a Scalar–Conformal Lorentzian Manifold
m5 Holonomic Coherence and Geometric Quantization on a Scalar–Conformal Manifold
m6 Bundled Loop Structures and Persistent Matter on Scalar–Conformal NUVO Space
m6-5 Anchors, Capacity Delivery, and Flux Imbalance in Scalar–Conformal NUVO Space
m7Gravitational Structural Response from Boundary Flux Evolution on Scalar–Conformal NUVO Space
m7-5 Boundary Flux Evolution Law on Scalar–Conformal NUVO Space
m8 Weak-Limit Exchange Structure on Scalar–Conformal NUVO Space
m9 Radiative Exchange Dynamics on Scalar–Conformal NUVO Space
m10 Composition of Scalar Modulation in Scalar–Conformal NUVO Space