Spatiotemporal Chaos in Large Systems Driven Far-From-Equilibrium: Connecting Theory with Experiment

Xu, Mu

04 October 2017

There are still many open questions regarding spatiotemporal chaos although many well developed theories exist for chaos in time. Rayleigh-B'enard convection is a paradigmatic example of spatiotemporal chaos that is also experimentally accessible. Discoveries uncovered using numerics can often be compared with experiments which can provide new physical insights. Lyapunov diagnostics can provide important information about the dynamics of small perturbations for chaotic systems. Covariant Lyapunov vectors reveal the true direction of perturbation growth and decay. The degree of hyperbolicity can also be quantified by the covariant Lyapunov vectors. To know whether a dynamical system is hyperbolic is important for the development of a theoretical understanding. In this thesis, the degree of hyperbolicity is calculated for chaotic Rayleigh-B'enard convection. For the values of the Rayleigh number explored, it is shown that the dynamics are non-hyperbolic. The spatial distribution of the covariant Lyapunov vectors is different for the different Lyapunov vectors. Localization is used to quantify this variation. The spatial localization of the covariant Lyapunov vectors has a decreasing trend as the order of the Lyapunov vector increases. The spatial localization of the covariant Lyapunov vectors are found to be related to the instantaneous Lyapunov exponents. The correlation is stronger as the order of the Lyapunov vector decreases. The covariant Lyapunov vectors are also computed using a spectral element approach. This allows an exploration of the covariant Lyapunov vectors in larger domains and for experimental conditions. The finite conductivity and finite thickness of the lateral boundaries of an experimental convection domain is also studied. Results are presented for the variation of the Nusselt number and fractal dimension for different boundary conditions. The fractal dimension changes dramatically with the variation of the finite conductivity. / Ph. D.

Dynamical Systems

Rayleigh-Bénard Convection

Covariant Lyapunov Vectors

Perturbation Growth and Prediction of Extreme Events

Sharafi, Nahal

16 November 2017

No description available.

571.4

Prediction

Extreme events

Covariant Lyapunov Vectors

Non-linear Dynamics

chaos

Complex Systems

Biologie (PPN619462639)

Chaotic Neural Circuit Dynamics

Engelken, Rainer

13 February 2017

No description available.

571.4

theoretical neuroscience

network dynamics

random dynamical systems

dynamical systems

information theory

chaos

rate network

spiking network

network state control

suppression of chaos

neural control

cortical dynamics

attractor dimension

Kolmogorov-Sinai entropy

action potential onset dynamics

balanced state

rate chaos

Lyapunov spectrum

covariant Lyapunov vectors

chaos control

reliability

balanced network

Biologie (PPN619462639)