Your search keyword '"Serhiy Yanchuk"' showing total 4 results

1. Generalized splay states in phase oscillator networks

Author

Rico Berner, Yuri Maistrenko, Eckehard Schöll, and Serhiy Yanchuk

Subjects

Trace (linear algebra), onset, media_common.quotation_subject, Phase (waves), FOS: Physical sciences, General Physics and Astronomy, Dynamical Systems (math.DS), Inertia, stimulation, coupled oscillators, symbols.namesake, Simple (abstract algebra), FOS: Mathematics, ddc:530, Statistical physics, tinnitus, Mathematics - Dynamical Systems, Mathematical Physics, media_common, Physics, Kuramoto model, Applied Mathematics, Statistical and Nonlinear Physics, Observable, dynamics, 530 Physik, Nonlinear Sciences - Adaptation and Self-Organizing Systems, coordinated reset, Stability conditions, Jacobian matrix and determinant, symbols, synchronization, Adaptation and Self-Organizing Systems (nlin.AO), Linear stability

Abstract

This article may be downloaded for personal use only. Any other use requires prior permission of the author and AIP Publishing. This article appeared in: Berner, R., Yanchuk, S., Maistrenko, Y., & Schöll, E. (2021). Generalized splay states in phase oscillator networks. In Chaos: An Interdisciplinary Journal of Nonlinear Science (Vol. 31, Issue 7, p. 073128). AIP Publishing. https://doi.org/10.1063/5.0056664 and may be found at https://doi.org/10.1063/5.0056664., Networks of coupled phase oscillators play an important role in the analysis of emergent collective phenomena. In this article, we introduce generalized m-splay states constituting a special subclass of phase-locked states with vanishing mth order parameter. Such states typically manifest incoherent dynamics, and they often create high-dimensional families of solutions (splay manifolds). For a general class of phase oscillator networks, we provide explicit linear stability conditions for splay states and exemplify our results with the well-known Kuramoto-Sakaguchi model. Importantly, our stability conditions are expressed in terms of just a few observables such as the order parameter or the trace of the Jacobian. As a result, these conditions are simple and applicable to networks of arbitrary size. We generalize our findings to phase oscillators with inertia and adaptively coupled phase oscillator models. Published under an exclusive license by AIP Publishing.

Published

2021

2. Chaotic bursting in semiconductor lasers

Author

Serhiy Yanchuk and Stefan Ruschel

Subjects

Physics, Singular perturbation, Applied Mathematics, Chaotic, FOS: Physical sciences, General Physics and Astronomy, Statistical and Nonlinear Physics, Pattern Formation and Solitons (nlin.PS), Delay differential equation, Low frequency, Nonlinear Sciences - Pattern Formation and Solitons, 01 natural sciences, 010305 fluids & plasmas, Pulse (physics), Semiconductor laser theory, Bursting, 0103 physical sciences, Statistical physics, 010306 general physics, Mathematical Physics, Envelope (waves)

Abstract

We investigate the dynamic mechanisms for low frequency fluctuations in semiconductor lasers subject to delayed optical feedback, using the Lang-Kobayashi model. This system of delay differential equations displays pronounced envelope dynamics, ranging from erratic, so called low frequency fluctuations to regular pulse packages, if the time scales of fast oscillations and envelope dynamics are well separated. We investigate the parameter regions where low frequency fluctuations occur and compute their Lyapunov spectrum. Using geometric singular perturbation theory, we study this intermittent chaotic behavior and characterize these solutions as bursting slow-fast oscillations., Comment: 22 pages, 7 figures

Published

2017

3. Amplitude equations for collective spatio-temporal dynamics in arrays of coupled systems

Author

Serhiy Yanchuk, Tomasz Kapitaniak, Matthias Wolfrum, Andrzej Stefanski, and Przemyslaw Perlikowski

Subjects

Physics, Ring (mathematics), Applied Mathematics, General Physics and Astronomy, Statistical and Nonlinear Physics, Models, Theoretical, Type (model theory), 01 natural sciences, Chaos theory, Feedback, 010305 fluids & plasmas, Coupling (physics), Spatio-Temporal Analysis, Amplitude, Nonlinear Dynamics, Oscillometry, 0103 physical sciences, Ginzburg–Landau theory, Computer Simulation, Statistical physics, 010306 general physics, Algorithms, Mathematical Physics, Stationary state, Harmonic oscillator

Abstract

We study the coupling induced destabilization in an array of identical oscillators coupled in a ring structure where the number of oscillators in the ring is large. The coupling structure includes different types of interactions with several next neighbors. We derive an amplitude equation of Ginzburg-Landau type, which describes the destabilization of a uniform stationary state and close-by solutions in the limit of a large number of nodes. Studying numerically an example of unidirectionally coupled Duffing oscillators, we observe a coupling induced transition to collective spatio-temporal chaos, which can be understood using the derived amplitude equations.

Published

2015

4. Variability of spatio-temporal patterns in non-homogeneous rings of spiking neurons

Author

Serhiy Yanchuk, Przemyslaw Perlikowski, Peter A. Tass, and Oleksandr V. Popovych

Subjects

Models, Neurological, Action Potentials, General Physics and Astronomy, Biological Clocks, Constructive algorithms, medicine, Animals, Humans, ddc:530, Computer Simulation, Mathematical Physics, Multistability, Mathematics, Neurons, Quantitative Biology::Neurons and Cognition, business.industry, Applied Mathematics, Statistical and Nonlinear Physics, Neurophysiology, medicine.anatomical_structure, Homogeneous, Non homogeneous, Excitatory postsynaptic potential, Time moment, Neuron, Artificial intelligence, Nerve Net, Biological system, business

Abstract

We show that a ring of unidirectionally delay-coupled spiking neurons may possess a multitude of stable spiking patterns and provide a constructive algorithm for generating a desired spiking pattern. More specifically, for a given time-periodic pattern, in which each neuron fires once within the pattern period at a predefined time moment, we provide the coupling delays and/or coupling strengths leading to this particular pattern. The considered homogeneous networks demonstrate a great multistability of various travelling time- and space-periodic waves which can propagate either along the direction of coupling or in opposite direction. Such a multistability significantly enhances the variability of possible spatio-temporal patterns and potentially increases the coding capability of oscillatory neuronal loops. We illustrate our results using FitzHugh-Nagumo neurons interacting via excitatory chemical synapses as well as limit-cycle oscillators.

Published

2011