A log-free estimate for the diagonal paraproduct high × high low in the 3D Navier-Stokes equation

Abstract

We consider the diagonal paraproduct arising in the nonlinearity (u· ∇) u for the three-dimensional Navier-Stokes equations. On scale-critical windows and in the range 1/6 < δ 5/8 we obtain a log-free estimate at the level L2t H-1x for the projection P< N1-δ ∇(uN vN), consistent with the critical energy scheme. The main tools are phase-geometric integration, anisotropic local estimates on cylinders, and bilinear ell2 decoupling on a finite-rank surface; the narrow diagonal zone is controlled via suppression of the null form. The work is restricted to a single resonant component; extensions to the full structure (u ·∇) u and to supt versions are left for further analysis.

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