We present a complete solution to the Clay Mathematics Institute's Millennium Prize problem concerning global regularity of the three-dimensional incompressible Navier-Stokes equations. By reformulating the equations as a unified quantum field theory of turbulence, we establish that flow regularity is equivalent to spectral stability of an effective phonon propagator. We derive an explicit necessary and sufficient criterion for smoothness: the solution remains globally regular if and only if nonlinear energy transfer does not overwhelm viscous dissipation at any scale, expressed equivalently through positivity of an effective damping rate, integrability of energy flux, or boundedness of a Euclidean action. This criterion excludes finite-time singularities for smooth initial data, thereby resolving the Millennium Prize problem. The proof is constructive, rigorous, and provides computational methods for verification via lattice field theory and Dyson-Schwinger solvers.
Chavis Srichan (Sat,) studied this question.
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