Universality of the turbulent velocity profile

TL;DR

This paper investigates the universality of the turbulent velocity profile's logarithmic law, revealing that pressure gradient effects explain discrepancies across different flow geometries and restoring a universal description.

Contribution

It demonstrates that accounting for pressure gradient effects as higher-order perturbations reconciles variations and supports the universality of the turbulent velocity profile.

Findings

Pressure gradient effects cause deviations from the logarithmic law.

Correcting for pressure gradients restores universality.

A simple formulation can describe the velocity profile across flows.

Abstract

For nearly a century the universal logarithmic behaviour of the mean velocity profile in a parallel flow was a mainstay of turbulent fluid mechanics and its teaching. Yet many experiments and numerical simulations are not fit exceedingly well by it, and the question whether the logarithmic law is indeed universal keeps turning up in discussion and in writing. Large experiments have been set up in different parts of the world to confirm or deny the logarithmic law and accurately estimate von K\'arm\'an's constant, the coefficient that governs it. We show that the discrepancy among flows in different (circular or plane) geometries, and between these and the logarithmic law, can be ascribed to the effect of the pressure gradient. When this effect is accounted for in the form of a higher-order perturbation, universal agreement and a satisfactorily simple formulation are recovered.