Divergence Free Polar Wavelets for the Analysis and Representation of Fluid Flows

TL;DR

This paper introduces a new wavelet framework for efficiently analyzing and representing incompressible fluid flows, emphasizing divergence-free properties and directional features.

Contribution

The authors develop a divergence-free polar wavelet frame with closed-form expressions, multi-resolution structure, and directional selectivity for fluid flow analysis.

Findings

Efficient representation of divergence-free vector fields

Wavelets with closed-form expressions in frequency and spatial domains

Capability to model directional flow phenomena like vortex streets

Abstract

We present a Parseval tight wavelet frame for the representation and analysis of velocity vector fields of incompressible fluids. Our wavelets have closed form expressions in the frequency and spatial domains, are divergence free in the ideal, analytic sense, have a multi-resolution structure and fast transforms, and an intuitive correspondence to common flow phenomena. Our construction also allows for well defined directional selectivity, e.g. to model the behavior of divergence free vector fields in the vicinity of boundaries or to represent highly directional features like in a von K\'arm\'an vortex street. We demonstrate the practicality and efficiency of our construction by analyzing the representation of different divergence free vector fields in our wavelets.