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High Dimensional Chaos. Tutorial Session IASTED International Workshop on Modern Nonlinear Theory (Bifurcation and Chaos) ~Montreal 2007~ . Zdzislaw Musielak, Ph.D. and Dora Musielak, Ph.D. University of Texas at Arlington (UTA) Arlington, Texas (USA). Lecture 2.
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High Dimensional Chaos Tutorial Session IASTED International Workshop on Modern Nonlinear Theory (Bifurcation and Chaos) ~Montreal 2007~ Zdzislaw Musielak, Ph.D. and Dora Musielak, Ph.D. University of Texas at Arlington (UTA) Arlington, Texas (USA)
Lecture 2 Objective: Construct high-dimensional Lorenz and Duffing systems and study high-dimensional chaos (HDC). • High-dimensional Lorenz models • HDC in these models • High-dimensional Duffing systems • HDC in these systems • Summary
2D Rayleigh-Benard Convection Model Continuity equation for an incompressible fluid Navier-Stokes equation with constant viscosity Heat transfer equation with constant thermal conductivity Saltzman (1962)
Saltzman’s Equations = stream function = temperature changes due to convection = Prandtl number = coefficient of thermal diffusivity = Rayleigh number
Fourier Expansions where and are horizontal and vertical modes, respectively
Fourier Expansions where and are horizontal and vertical modes, respectively
Criteria for Mode Selection • Selected modes must lead to equations that • have bounded solutions (Curry 1978, 1979) 2. Selected modes must lead to a system that conserves energy in the dissipationless limit (Treve & Manley 1982; Thiffeault & Horton 1996; Roy & Musielak 2006)
From 3D to 5D Lorenz Models Lorenz minimal truncation: Resulting 3D Lorenz model has bounded solutions and conserves energy in dissipationless limit 4D model with - uncoupled ! 5D model with and - uncoupled !
6D Lorenz Models I Selected modes (Humi 2004): r = 28.45 System does not conserve energy in dissipationless limit !!! Route to chaos – period-doubling (?)
6D Lorenz Models II Selected modes (Kennamer 1995): r = 38 System does conserve energy in dissipationless limit Route to chaos – chaotic transients Musielak et al. (2005)
6D and 7D Lorenz Models Howard & Krishnamurti (1986) developed a 6D Lorenz model that included a shear flow Thiffeault & Horton (1996) showed that this 6D model does not conserve energy in the dissipationless limit To construct an energy conserving system, Thiffeault & Horton had to add another mode and develop a 7D Lorenz model
8D Lorenz Model Selected Fourier modes: 3D system 5D system 8D system Roy & Musielak (2007)
Energy Conservation Thieffault & Horton (1996)
Phase portraits r = 26.5 3D Lorenz System r = 38.5 8D System
Power spectra 8D system r = 28.50 r = 29.25 r = 35.10 r = 38.50
Lyapunov Exponents 8D System Onset of chaos at r = 36
Route to Chaos in 8D Model Ruelle & Takens (1971) Quasi-periodicity is route to chaos for 8D system, which is different than chaotic transients observed in 3D Lorenz model
Other Lorenz Models 14D Lorenz model (Curry 1978) Decay of two-tori leads to a strange attractor that is similar as the Lorenz strange attractor Model does not conserve energy in dissipationless limit 5D Lorenz model (Chen & Price 2006) A profile of the strange attractor in this model is similar to the Rayleigh-Benard convection problem in a plane fluid motion – Fourier modes describing shear flows are Included!
SUMMARY • Neither 4D nor 5D Lorenz models can be constructed. • Unphysical 6D–14D Lorenz models that do not conserve energy in the dissipationless limit have been constructed; chaotic transients, period-doubling and quasi-periodicity were identified as routes to chaos in these systems. • The lowest-order, high-dimensional (HD) Lorenz model that conserves energy in the dissipationless limit is an 8D model and its route to chaos is quasi-periodicity. • Since the strange attractor of the 8D systems has high dimension, the chaotic behavior observed in this system represents high-dimensional chaos (HDC).
Coupled Duffing Oscillators Systems considered: Symmetric systems (2, 4 and 6-coupled oscillators) Asymmetric systems (3 and 5-coupled oscillators) D. Musielak, Z. Musielak & J. Benner (2005)
2-Coupled Duffing Oscillators II Chaos: B = 14.5 – 19.0 B = 23 – 25.5 Ueda et al (1979, 1980) Lyapunov exponents Original Duffing system has 8 regions that exhibit chaos
2-Coupled Duffing Oscillators II B = 24 B = 19 Routes to chaos: Period – Doubling and Crisis
4-Coupled Duffing Systems I Torus at B = 86 B = 40.5 – 42 (period-doubling) B = 82 – 124 (quasi-periodicity) Role played by crisis!
4-Coupled Duffing Systems II B = 87 Power spectra for four masses showing a 3-periodic window B = 91.5
6-Coupled Duffing Oscillators B = 73.8, 74.15 and 76.6 B = 72 – 95 (quasi-periodicity) Other regions - crisis
3-Coupled Duffing Systems B = 24.8 B = 63 – 72 (quasi-periodicity) B = 74.5 – 77 (crisis) No chaos!
5-Coupled Duffing Oscillators B = 75 – 105 (quasi-periodicity) B = 106 – 120 (crisis) B = 79, 81.3, 81.7 and 85.7
Period-Doubling Cascade Formation of a 2D torus and its decay into a periodic motion Locking of two incommensurable frequencies
SUMMARY • HD symmetric (2, 4 and 6-coupled Duffing oscillators) and asymmetric (3 and 5-coupled Duffing oscillators) Duffing systems have been constructed • Chaotic behavior of these systems represents HDC and routes to chaos observed in these systems range from period-doubling to quasi-periodicity and crisis • All systems have one region that exhibits quasi-periodicity. The quasi-periodic torus breaks down through a 3-periodic window and 2-periodic window for the symmetric and asymmetric systems, respectively. • Decay of quasi-periodic torus observed in symmetric systems is a new route to chaos