Time Averages and Periodic Attractors at High Rayleigh Number for Lorenz-like Models

Revisiting the Lorenz ’63 equations in the regime of large of Rayleigh number, we study the occurrence of periodic solutions and quantify corresponding time averages of selected quantities. Perturbing from the integrable limit of infinite ρ , we provide a full proof of existence and stability of sym...

Full description

Saved in:
Bibliographic Details
Published in:Journal of nonlinear science 2023-10, Vol.33 (5), Article 73
Main Authors: Ovsyannikov, Ivan, Rademacher, Jens D. M., Welter, Roland, Lu, Bing-ying
Format: Article
Language:English
Subjects:
Analysis
Classical Mechanics
Economic Theory/Quantitative Economics/Mathematical Methods
Elliptic functions
Hysteresis loops
Lorenz equations
Mathematical and Computational Engineering
Mathematical and Computational Physics
Mathematical models
Mathematics
Mathematics and Statistics
Orbits
Rayleigh number
Theoretical
Citations: Items that this one cites
Items that cite this one
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:Revisiting the Lorenz ’63 equations in the regime of large of Rayleigh number, we study the occurrence of periodic solutions and quantify corresponding time averages of selected quantities. Perturbing from the integrable limit of infinite ρ , we provide a full proof of existence and stability of symmetric periodic orbits, which confirms previous partial results. Based on this, we expand time averages in terms of elliptic integrals with focus on the much studied average ‘transport,’ which is the mode reduced excess heat transport of the convection problem that gave rise to the Lorenz equations. We find a hysteresis loop between the periodic attractors and the nonzero equilibria of the Lorenz equations. These have been proven to maximize transport, and we show that the transport takes arbitrarily small values in the family of periodic attractors. In particular, when the nonzero equilibria are unstable, we quantify the difference between maximal and typically realized values of transport. We illustrate these results by numerical simulations and show how they transfer to various extended Lorenz models.
ISSN:0938-8974
1432-1467
DOI:10.1007/s00332-023-09933-x