Universal Area Law in Turbulence

Abstract

We re-visit the Area Law in Turbulence discovered many years ago M93 and verified recently in numerical experimentsS19. We derive this law in a simpler way, at the same time outlining the limits of its applicability. Using the PDF for velocity circulation as a functional of the loop in coordinate space, we obtain explicit formulas for vorticity correlations in presence of velocity circulation. These functions are related to the shape of the scaling function of the PDF as well as the shape of the minimal surface inside the loop. The background of velocity circulation does not eliminate turbulence but makes observable quantities in inertial range calculable. The scaling dimension of velocity circulation as a function of large area remains unknown. Numerical experiments S19 suggest transition for log-log derivative of circulation moments <p> by the loop area from Kolmogorov index 2p3 at p <4 down to approximately 0.58 p for 4 ≤ p ≤ 10 within available Reynolds numbers. We argue that Area Law applies to these moments only in the limit p→ ∞ when they are dominated by the tails of the PDF. So, these numerical experiments suggest that the scaling index in Area law is less then 23.