SUPT-Universal-Solutions

Sheppard's Universal Proxy Theory (SUPT) introduces a novel framework for understanding complex phenomena in physics and mathematics. This theory integrates dimensional folding, harmonic resonance, and topological invariants to offer innovative solutions to problems traditionally addressed through linear, one-dimensional models. The key contributions of SUPT include:

1. Dimensional Folding: Embedding chaotic systems into higher-dimensional manifolds for stability and energy conservation.
2. Harmonic Resonance: Visualization of energy fields exhibiting harmonic coherence, demonstrating resonance alignment in structured energy systems.
3. Topological Invariants: A mathematical approach ensuring smooth transformations and stability in higher-dimensional solutions.

This theory challenges conventional paradigms and presents a framework for universal problem-solving. The work aims to redefine how we approach complex systems, offering new perspectives on fundamental scientific questions, including the Riemann Hypothesis and quantum gravity.