# An algebraic reduction of the `scaling gap' in the Navier-Stokes   regularity problem

**Authors:** Zachary Bradshaw, Aseel Farhat, and Z. Grujic

arXiv: 1704.05546 · 2018-10-17

## TL;DR

This paper introduces an algebraic reduction of the scaling gap in the Navier-Stokes regularity problem, improving bounds by leveraging the geometry of vorticity regions and turbulence physics.

## Contribution

It demonstrates an algebraic improvement over traditional logarithmic reductions in the scaling gap using a novel mathematical framework.

## Key findings

- Achieved algebraic reduction of the scaling gap
- Bounded super-level sets of vorticity components
- Aligned mathematical results with turbulence observations

## Abstract

It is shown--within a mathematical framework based on the suitably defined scale of sparseness of the super-level sets of the positive and negative parts of the vorticity components, and in the context of a blow-up-type argument--that the ever-resisting `scaling gap', i.e., the scaling distance between a regularity criterion and a corresponding a priori bound (shortly, a measure of the super-criticality of the 3D Navier-Stokes regularity problem), can be reduced by an algebraic factor; since (independent) fundamental works of Ladyzhenskaya, Prodi and Serrin as well as Kato and Fujita in 1960s, all the reductions have been logarithmic in nature, regardless of the functional set up utilized. More precisely, it is shown that it is possible to obtain an a priori bound that is algebraically better than the energy-level bound, while keeping the corresponding regularity criterion at the same level as all the classical regularity criteria. The mathematics presented was inspired by morphology of the regions of intense vorticity/velocity gradients observed in computational simulations of turbulent flows, as well as by the physics of turbulent cascades and turbulent dissipation.

## Full text

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## Figures

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## References

34 references — full list in the complete paper: https://tomesphere.com/paper/1704.05546/full.md

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Source: https://tomesphere.com/paper/1704.05546