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Main Authors: Li, Jian, Si, Wenwen, Li, Yi
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2501.15482
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author Li, Jian
Si, Wenwen
Li, Yi
author_facet Li, Jian
Si, Wenwen
Li, Yi
contents We conduct direct numerical simulations to investigate the synchronization of Kolmogorov flows in a periodic box, with a focus on the mechanisms underlying the asymptotic evolution of infinitesimal velocity perturbations, also known as conditional leading Lyapunov vectors. This study advances previous work with a spectral analysis of the perturbation, which clarifies the behaviours of the production and dissipation spectra at different coupling wavenumbers. We show that, in simulations with moderate Reynolds numbers, the conditional leading Lyapunov exponent can be smaller than a lower bound proposed previously based on a viscous estimate. A quantitative analysis of the self-similar evolution of the perturbation energy spectrum is presented, extending the existing qualitative discussion. The prerequisites for obtaining self-similar solutions are established, which include an interesting relationship between the integral length scale of the perturbation velocity and the local Lyapunov exponent. By examining the governing equation for the dissipation rate of the velocity perturbation, we reveal the previously neglected roles of the strain rate and vorticity perturbations and uncover their unique geometrical characteristics.
format Preprint
id arxiv_https___arxiv_org_abs_2501_15482
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The spectral dynamics and spatial structures of the conditional Lyapunov vector in slave Kolmogorov flow
Li, Jian
Si, Wenwen
Li, Yi
Fluid Dynamics
We conduct direct numerical simulations to investigate the synchronization of Kolmogorov flows in a periodic box, with a focus on the mechanisms underlying the asymptotic evolution of infinitesimal velocity perturbations, also known as conditional leading Lyapunov vectors. This study advances previous work with a spectral analysis of the perturbation, which clarifies the behaviours of the production and dissipation spectra at different coupling wavenumbers. We show that, in simulations with moderate Reynolds numbers, the conditional leading Lyapunov exponent can be smaller than a lower bound proposed previously based on a viscous estimate. A quantitative analysis of the self-similar evolution of the perturbation energy spectrum is presented, extending the existing qualitative discussion. The prerequisites for obtaining self-similar solutions are established, which include an interesting relationship between the integral length scale of the perturbation velocity and the local Lyapunov exponent. By examining the governing equation for the dissipation rate of the velocity perturbation, we reveal the previously neglected roles of the strain rate and vorticity perturbations and uncover their unique geometrical characteristics.
title The spectral dynamics and spatial structures of the conditional Lyapunov vector in slave Kolmogorov flow
topic Fluid Dynamics
url https://arxiv.org/abs/2501.15482