Anomalous scaling and generic structure function in turbulence

TL;DR

This paper explores the origin of anomalous scaling in turbulence through zero modes of scale-invariant operators, proposing a new exponential form for structure functions influenced by Reynolds number.

Contribution

It introduces a mechanism for anomalous scaling in turbulence based on zero modes, leading to a novel exponential self-similar form of structure functions.

Findings

Structure functions follow an exponential self-similar form.

The scaling behavior depends on the Reynolds number.

The approach aligns with General Scaling and Extended Self-Similarity.

Abstract

We discuss on an example a general mechanism of apparition of anomalous scaling in scale invariant systems via zero modes of a scale invariant operator. We discuss the relevance of such mechanism in turbulence, and point out a peculiarity of turbulent flows, due to the existence of both forcing and dissipation. Following these considerations, we show that if this mechanism of anomalous scaling is operating in turbulence, the structure functions can be constructed by simple symmetry considerations. We find that the generical scale behavior of structure functions in the inertial range is not self-similar $S_n(\ell)\propto \ell^{\zeta_n}$ but includes an "exponential self-similar" behavior $S_n(\ell) \propto \exp[\zeta_n\alpha^{-1} \ell^{\alpha}]$ where $\alpha$ is a parameter proportional to the inverse of the logarithm of the Reynolds number. The solution also follows exact General Scaling and approximate Extended Self-Similarity.