Energy cascades and flux locality in physical scales of the 3D Navier-Stokes equations

Abstract

Rigorous estimates for the total - (kinetic) energy plus pressure - flux in R3 are obtained from the three dimensional Navier-Stokes equations. The bounds are used to establish a condition - involving Taylor length scale and the size of the domain - sufficient for existence of the inertial range and the energy cascade in decaying turbulence (zero driving force, non-increasing global energy). Several manifestations of the locality of the flux under this condition are obtained. All the scales involved are actual physical scales in R3 and no regularity or homogeneity/scaling assumptions are made.