The Conference includes three types of presentations
Key Note Presentations on the main topics of the Conference selected by the Program Committee;
Contributed papers or posters proposed by authors;
Special Sessions proposed from people working in a special topic of the Chaotic field and accepted by the Program Committee
Every Special Session includes 4-5 presentations. The session organizer is responsible for the selection and the review process of the papers of his session. The topics proposed for the Conference Chaos2009 include but are not limited to:
1. Chaos and Nonlinear Dynamics Nonlinear dynamics of continuous, discontinuous and hybrid systems Nonlinear dynamics and chaos in engineering applications Qualitative and quantitative analysis of nonlinear dynamic systems Synchronization and control of dynamical systems Classical Deterministic Chaos Dynamical processes: theory and applications Complex dynamical systems Extremes in Chaotic Systems Differential equations and new transforms applications Nonlinear fractional partial differential equations Integral equations and applications Topological dynamics Asymptotic Methods Numerical and geometrical methods in nonlinear dynamics Computational Aspects Computer aided symbolic methods in dynamics Symmetries and perturbation methods Chaos: critical behavior and universality Liapunov functions Phase diagrams Bifurcation theory Analysis of bifurcations and chaos Hopf Bifurcation, sequence of period-doubling bifurcations and chaos Chaotic models and attractors (Logistic, H�non, Lorenz, R�ssler,...) Chaotic network dynamics Fractals
2. Stochastic Chaos Stochastic Chaos versus Deterministic Bifurcation to stochastic chaos Stochastic global bifurcation in perturbed Hamiltonian systems Stochastic chaos in Fokker-Planck equations Stochastic chaos and its control Bifurcation and Chaotic Analysis of Stochastic Duffing System Stochastic chaos: an analogue of quantum chaos Heterogeneity and stochastic chaos in stock markets Stochastic chaos in Ecology The transition from deterministic chaos to a stochastic process Chaotic Transitions in Deterministic and Stochastic Dynamical Systems Stochasticity and deterministic chaos Nonlinear Stochastic Systems 3. Chemical Chaos Chemical reaction chaos Belousov-Zhabotinsky Reactions Reaction diffusion patterns Pattern-Formation Spatially extended systems and pattern formation 4. Data Analysis and Chaos Analysis of chaotic data Chaos and time-series analysis Principal Component Analysis and Chaos Data analysis and spatiotemporal chaos Chaos and innovation Polynomial chaos Embbeding chaos 5. Hydrodynamics, Turbulence and Plasmas Turbulence Turbulent Transport Turbulence simulation Entropy of particles on a turbulent sea Rayleigh-Benard convection Fluid Mechanics and Turbulence Chaotic advection Chaotic advection in oscillatory flows Von Karman flow Von Karman vortex streets 6. Optics and Chaos Nonlinear optics Laser optics and chaos The Ikeda attractor Quantum chaos 7. Chaotic Oscillations and Circuits Chaotic delay equations Chaotic communication Chaotic oscillators Phenomena and criteria of chaotic oscillations Nonlinear Vibrations and Applications Van der Pol oscillators Chaotic synchronization SHIL�NIKOV Chaos CHUA�S oscillators Synchronization and delay between signals Nonlinear filtering and communication Control of oscillations and chaos Control of Chaos and Synchronization Chaos and multi channel communication
8. Chaos in Climate Dynamics Chaos in simplified Climate Models (The Lorenz model) Weather forecasts Earth's climate
9. Geophysical Flows Geodesic flows Spatially extended systems Spatiotemporal pattern formation and chaos Vortex ripples in sand Coupled map lattice and spatiotemporal pattern formation Self-Organized criticality Multifractal geophysics 10. Biology and Chaos Computational Biology and Chaos Fractal geometry in Biology Chaos control in Biology Nonlinear dynamics of protein folding Biomechanics
11. Neurophysiology and Chaos Neurons and Chaos Chaos in the Brain Chaos in the Heart Neurocomputation Parameter estimation for neuron models
12. Hamiltonian systems Dynamics of conservative and dissipative systems Flow equations for Hamiltonians Ergodic theory Hamiltonian and Quantum Chaos
13. Chaos in Astronomy and Astrophysics Chaos in the Solar system N-body Chaos Dynamics and Optimization of Multibody Systems Chaos in Galaxies The H�non-Heiles system Order and chaos in galaxies Galaxy simulations Nonlinearity in Plasma and Astrophysics
14. Chaos and Solitons Integrable Systems and Solitons The Korteweg�de Vries equation Bifurcation and chaos in the generalized Korteweg-de Vries equation The generalized KdV-Burgers' equation The Zakharov-Kuznetsov equation The sine-Gordon equation The generalized Burgers-Huxley equation Darboux transformations for soliton equations
15. Micro- and Nano- Electro-Mechanical Systems Electrospun Nanofibers and applications Nonlinear phenomena in electrospinning Micro egg-shaped product via electrospinning
16. Neural Networks Fuzzy neural networks Discrete-time recurrent neural networks Delayed neural networks Fuzzy bilinear systems Fuzzy control
17. Chaos, Ecology and Economy Bifurcations and chaos in ecology Nonlinear dynamics in spatial systems Evolution on eco-epidemiological systems Surviving chaos and change Oscillations and chaos in dynamic economic models Control of chaotic population dynamics Sustainable development
18. Algorithmic Music Composition Chaotic compositions Nonlinear models and compositions Deterministic or stochastic models of algorithmic compositions Mathematical analysis of compositions and applications Compositions with geometric forms