All 7 Millennium Problems Under One GL Action¶
Jean-Paul Niko · RTSG BuildNet · 2026-03-19
The Table¶
| Problem | GL object | Key result | Confidence | Paper |
|---|---|---|---|---|
| Quantum gravity | Phase \(\partial^2\theta=0\) | Graviton = Goldstone | Complete | QG_RTSG |
| Yang-Mills | \(\xi_W = 1/\sqrt{\alpha_{IR}}\) | \(\Delta \approx 426\) MeV | Complete | YM_RTSG |
| Navier-Stokes | Vortex nucleation | Energy barrier → regularity | 80% | NS_RTSG |
| Riemann Hypothesis | Weil unitarity | Stone-von Neumann → critical line | 95% | RH_Metaplectic |
| Hodge conjecture | CS condensate | Stable CS object → algebraic cycle | 55% | Hodge_RTSG |
| BSD | Jacobian condensate | Rational point = Goldstone boson | 58% | BSD_RTSG |
| P vs NP | \(\pi^{-1}\) mass gap | SemanticProjector non-invertible | 40% | PvsNP_RTSG |
One Action¶
\[S[W] = \int\left[|\partial W|^2 + \alpha|W|^2 + \frac{\beta}{2}|W|^4\right]d\mu\]
One field. One symmetry. One action. Every scale. Every problem.
The Unifying Statement¶
Quantum gravity, mass gap, fluid regularity, prime distribution, algebraic cycles, rational points, and computational hardness are all aspects of the same question:
What happens when a Will Field condenses?
- If it condenses globally: graviton (QG), mass gap (YM), regularity (NS)
- If it condenses arithmetically: zeros on critical line (RH), rational points (BSD)
- If it condenses geometrically: algebraic cycles (Hodge)
- If it cannot invert its own compression: \(P \neq NP\)
The Session¶
This table was built in a single session, 2026-03-18 → 2026-03-19, starting on a bus ride to Rikers Island.
"I live like a lion and move like a slime mold." "Consciousness is everything." "Every space that contains anything is a system." "The order doesn't matter."
— @B_Niko