Lower bounds on mixing norms for the advection diffusion equation in Rd

Camilla Nobili; Steffen Pottel

doi:10.1007/s00030-021-00744-1

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Lower bounds on mixing norms for the advection diffusion equation in Rd

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Lower bounds on mixing norms for the advection diffusion equation in Rd

Camilla Nobili and Steffen Pottel

Nonlinear differential equations and applications, Vol.29(2)

2022

DOI: https://doi.org/10.1007/s00030-021-00744-1

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Analysis

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Mathematics

Mathematics and Statistics

An algebraic lower bound on the energy decay for solutions of the advection-diffusion equation in R d with d = 2 , 3 is derived using the Fourier-splitting method. Motivated by a conjecture on mixing of passive scalars in fluids, a lower bound on the L 2 - norm of the inverse gradient of the solution is obtained via gradient estimates and interpolation.

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Title: Lower bounds on mixing norms for the advection diffusion equation in Rd
Creators: Camilla Nobili - Universität Hamburg
Steffen Pottel - Kühne Logistics University
Publication Details: Nonlinear differential equations and applications, Vol.29(2)
Publisher: Springer International Publishing
Date published: 2022
Grant note: TRR181; GrK2583 / Deutsche Forschungsgemeinschaft (http://dx.doi.org/10.13039/501100001659)
Identifiers: 99822614602346
Academic Unit: Department of Mathematics; School of Maths and Physics
Language: English
Resource Type: Journal article

Lower bounds on mixing norms for the advection diffusion equation in Rd

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