5 research outputs found
Parameter estimation in spatially extended systems: The Karhunen-Loeve and Galerkin multiple shooting approach
Parameter estimation for spatiotemporal dynamics for coupled map lattices and
continuous time domain systems is shown using a combination of multiple
shooting, Karhunen-Loeve decomposition and Galerkin's projection methodologies.
The resulting advantages in estimating parameters have been studied and
discussed for chaotic and turbulent dynamics using small amounts of data from
subsystems, availability of only scalar and noisy time series data, effects of
space-time parameter variations, and in the presence of multiple time-scales.Comment: 11 pages, 5 figures, 4 Tables Corresponding Author - V. Ravi Kumar,
e-mail address: [email protected]
Heteroclinic Ratchets in a System of Four Coupled Oscillators
We study an unusual but robust phenomenon that appears in an example system
of four coupled phase oscillators. We show that the system can have a robust
attractor that responds to a specific detuning between certain pairs of the
oscillators by a breaking of phase locking for arbitrary positive detunings but
not for negative detunings. As the dynamical mechanism behind this is a
particular type of heteroclinic network, we call this a 'heteroclinic ratchet'
because of its dynamical resemblance to a mechanical ratchet