Your search keyword '"José D. Szezech"' showing total 20 results

1. Transport barriers in symplectic maps

Author

A. C. Mathias, Iberê L. Caldas, Ricardo L. Viana, B. Bartoloni, M. S. Santos, Antonio M. Batista, A. B. Schelin, B. B. Leal, J. V. Gomes, Michele Mugnaine, Philip J. Morrison, C. V. Abud, and José D. Szezech

Subjects

Physics, Dynamical systems theory, 010308 nuclear & particles physics, Turbulence, Kolmogorov–Arnold–Moser theorem, TOKAMAKS, Chaotic, General Physics and Astronomy, FOS: Physical sciences, Nonlinear Sciences - Chaotic Dynamics, 01 natural sciences, Physics - Plasma Physics, Magnetic field, Plasma Physics (physics.plasm-ph), Nonlinear Sciences::Chaotic Dynamics, Simple (abstract algebra), 0103 physical sciences, Line (geometry), Statistical physics, Chaotic Dynamics (nlin.CD), 010306 general physics, Symplectic geometry

Abstract

Chaotic transport is a subject of paramount importance in a variety of problems in plasma physics, specially those related to anomalous transport and turbulence. On the other hand, a great deal of information on chaotic transport can be obtained from simple dynamical systems like two-dimensional area-preserving (symplectic) maps, where powerful mathematical results like KAM theory are available. In this work, we review recent works on transport barriers in area-preserving maps, focusing on systems which do not obey the so-called twist property. For such systems, usual KAM theory no longer holds everywhere and novel dynamical features show up as non-resistive reconnection, shearless curves, and shearless bifurcations. After presenting some general features using a standard nontwist mapping, we consider magnetic field line maps for magnetically confined plasmas in tokamaks.

Published

2021

2. Curry–Yorke route to shearless attractors and coexistence of attractors in dissipative nontwist systems

Author

Antonio M. Batista, Ricardo L. Viana, Michele Mugnaine, Iberê L. Caldas, José D. Szezech, Ricardo Egydio de Carvalho, Federal University of Paraná, State University of Ponta Grossa, Universidade de São Paulo (USP), and Universidade Estadual Paulista (Unesp)

Subjects

Physics, Applied Mathematics, Chaotic, General Physics and Astronomy, Statistical and Nonlinear Physics, Lyapunov exponent, 01 natural sciences, Quasiperiodic motion, 010305 fluids & plasmas, Hamiltonian system, Nonlinear Sciences::Chaotic Dynamics, symbols.namesake, Quasiperiodic function, 0103 physical sciences, Attractor, SISTEMAS DISSIPATIVO, Dissipative system, symbols, Statistical physics, 010306 general physics, Mathematical Physics, Multistability

Abstract

Made available in DSpace on 2021-06-25T10:52:37Z (GMT). No. of bitstreams: 0 Previous issue date: 2021-02-01 The routes to chaos play an important role in predictions about the transitions from regular to irregular behavior in nonlinear dynamical systems, such as electrical oscillators, chemical reactions, biomedical rhythms, and nonlinear wave coupling. Of special interest are dissipative systems obtained by adding a dissipation term in a given Hamiltonian system. If the latter satisfies the so-called twist property, the corresponding dissipative version can be called a dissipative twist system.Transitions to chaos in these systems are well established; for instance, the Curry-Yorke route describes the transition from a quasiperiodic attractor on torus to chaos passing by a chaotic banded attractor. In this paper, we study the transitions from an attractor on torus to chaotic motion in dissipative nontwist systems. We choose the dissipative standard nontwist map, which is a non-conservative version of the standard nontwist map. In our simulations, we observe the same transition to chaos that happens in twist systems, known as a soft one, where the quasiperiodic attractor becomes wrinkled and then chaotic through the Curry-Yorke route. By the Lyapunov exponent, we study the nature of the orbits for a different set of parameters, and we observe that quasiperiodic motion and periodic and chaotic behavior are possible in the system. We observe that they can coexist in the phase space, implying in multistability. The different coexistence scenarios were studied by the basin entropy and by the boundary basin entropy. Department of Physics Federal University of Paraná Department of Mathematics and Statistics State University of Ponta Grossa Graduate in Science Program - Physics State University of Ponta Grossa Institute of Physics University of São Paulo Department of Statistics Applied Mathematics and Computer Science Institute of Geosciences and Exact Sciences Ͽ IGCE São Paulo State University (UNESP) Department of Statistics Applied Mathematics and Computer Science Institute of Geosciences and Exact Sciences Ͽ IGCE São Paulo State University (UNESP)

Published

2021

3. Ratchet current in nontwist Hamiltonian systems

Author

José D. Szezech, Antonio M. Batista, Ricardo L. Viana, Michele Mugnaine, and Iberê L. Caldas

Subjects

Physics, Applied Mathematics, Ratchet, General Physics and Astronomy, Perturbation (astronomy), Statistical and Nonlinear Physics, Parameter space, Ratchet effect, 01 natural sciences, 010305 fluids & plasmas, Hamiltonian system, Classical mechanics, SISTEMAS DINÂMICOS (FÍSICA MATEMÁTICA), Phase space, 0103 physical sciences, Wavenumber, Twist, 010306 general physics, Mathematical Physics

Abstract

Non-monotonic area-preserving maps violate the twist condition locally in phase space, giving rise to shearless invariant barriers surrounded by twin island chains in these regions of phase space. For the extended standard nontwist map, with two resonant perturbations with distinct wave numbers, we investigate the presence of such barriers and their associated island chains and compare our results with those that have been reported for the standard nontwist map with only one perturbation. Furthermore, we determine in the control parameter space the existence of the shearless barrier and the influence of the additional wave number on this condition. We show that only for odd second wave numbers are the twin island chains symmetrical. Moreover, for even wave numbers, the lack of symmetry between the chains of twin islands generates a ratchet effect that implies a directed transport in the phase space.

Published

2020

4. Basin of attraction for chimera states in a network of Rössler oscillators

Author

Fernando S. Borges, Kelly C. Iarosz, Iberê L. Caldas, Murilo S. Baptista, Antonio M. Batista, Ricardo L. Viana, Vagner Bezerra dos Santos, and José D. Szezech

Subjects

Physics, Coupling strength, Applied Mathematics, Chaotic, General Physics and Astronomy, Statistical and Nonlinear Physics, Structural basin, FÍSICA DE PLASMAS, 01 natural sciences, Attraction, 010305 fluids & plasmas, Fractal, Uncertainty exponent, 0103 physical sciences, Statistical physics, 010306 general physics, Control parameters, Mathematical Physics

Abstract

Chimera states are spatiotemporal patterns in which coherent and incoherent dynamics coexist simultaneously. These patterns were observed in both locally and nonlocally coupled oscillators. We study the existence of chimera states in networks of coupled Rössler oscillators. The Rössler oscillator can exhibit periodic or chaotic behavior depending on the control parameters. In this work, we show that the existence of coherent, incoherent, and chimera states depends not only on the coupling strength, but also on the initial state of the network. The initial states can belong to complex basins of attraction that are not homogeneously distributed. Due to this fact, we characterize the basins by means of the uncertainty exponent and basin stability. In our simulations, we find basin boundaries with smooth, fractal, and riddled structures.

Published

2020

5. Delayed feedback control of phase synchronisation in a neuronal network model

Author

Kelly C. Iarosz, E. L. Lameu, Fabiano A. S. Ferrari, Rafael R. Borges, José D. Szezech, Michele Mugnaine, Iberê L. Caldas, Fernando S. Borges, Ricardo L. Viana, Antonio M. Batista, Jürgen Kurths, and Adriane S. Reis

Subjects

Computer science, Feedback control, Phase (waves), Process (computing), food and beverages, General Physics and Astronomy, Network structure, 01 natural sciences, 03 medical and health sciences, 0302 clinical medicine, medicine.anatomical_structure, Cerebral cortex, 0103 physical sciences, Biological neural network, medicine, General Materials Science, Physical and Theoretical Chemistry, 010306 general physics, Subnetwork, Neuroscience, 030217 neurology & neurosurgery

Abstract

The human cerebral cortex can be separated into cortical areas forming a clustered network structure. We build two different clustered networks, where one network is based on a healthy brain and the other according to a brain affected by a neurodegenerative process. Each cortical area has a subnetwork with small-world properties. We verify that both networks exhibit rich-club organisation and phase synchronisation. Due to the fact that neuronal synchronisation can be related to brain diseases, we consider the delayed feedback control as a method to suppress synchronous behaviours. In this work, it is presented that depending on the feedback parameters, intensity and time delay, phase synchronisation in both networks can be suppressed. Therefore, one of our main results is to show that delayed feedback control can be used to suppress undesired synchronous behaviours not only in the healthy brain, but also in the brain marked by neurodegenerative processes.

Published

2018

6. Stochastic resonance in dissipative drift motion

Author

José D. Szezech, Miguel A. F. Sanjuán, Antonio M. Batista, Jesús M. Seoane, and Ricardo S. Oyarzabal

Subjects

Physics, Numerical Analysis, Work (thermodynamics), Stochastic resonance, Applied Mathematics, 01 natural sciences, 010305 fluids & plasmas, Wave model, Classical mechanics, Modeling and Simulation, 0103 physical sciences, Dissipative system, Stochastic drift, Statistical physics, 010306 general physics, Focus (optics), Scaling, Noise (radio)

Abstract

We study a simple model of drift waves that describes the particle transport in magnetised plasmas. In particular, we focus our attention on the effects of noise on a dissipative drift wave model. In the noiseless case, the relationship between the escape time and the damping term obeys a power-law scaling. In this work, we show that peaks in the escape time are enhanced for certain values of the noise intensity, when noise is added in the dissipative drift motion. This enhancement occurs in the situation where stochastic resonance (SR) appears. We also observe that the noise produces significant alterations to the escape time distribution. This way, we expect this work to be useful for a better understanding of drift wave models in the presence of noise, since noise is a natural ingredient in the environment of this kind of physical problems.

Published

2018

7. Chimera-like states in a neuronal network model of the cat brain

Author

Fernando S. Borges, Kelly C. Iarosz, Iberê L. Caldas, M. S. Santos, José D. Szezech, Ricardo L. Viana, Antonio M. Batista, and Jürgen Kurths

Subjects

Physics, General Mathematics, Applied Mathematics, fungi, General Physics and Astronomy, Statistical and Nonlinear Physics, Complex network, 01 natural sciences, 010305 fluids & plasmas, Bursting, medicine.anatomical_structure, Neuronal noise, Cerebral cortex, 0103 physical sciences, medicine, Biological neural network, Premovement neuronal activity, Neuron, 010306 general physics, Neuroscience

Abstract

Neuronal systems have been modelled by complex networks in different description levels. Recently, it has been verified that the networks can simultaneously exhibit one coherent and other incoherent domain, known as chimera states. In this work, we study the existence of chimera-like states in a network considering the connectivity matrix based on the cat cerebral cortex. The cerebral cortex of the cat can be separated in 65 cortical areas organised into the four cognitive regions: visual, auditory, somatosensory-motor and frontolimbic. We consider a network where the local dynamics is given by the Hindmarsh–Rose model. The Hindmarsh–Rose equations are a well known model of the neuronal activity that has been considered to simulate the membrane potential in neuron. Here, we analyse under which conditions chimera-like states are present, as well as the effects induced by intensity of coupling on them. We identify two different kinds of chimera-like states: spiking chimera-like state with desynchronised spikes, and bursting chimera-like state with desynchronised bursts. Moreover, we find that chimera-like states with desynchronised bursts are more robust to neuronal noise than with desynchronised spikes.

Published

2017

8. Synchronization of phase oscillators with coupling mediated by a diffusing substance

Author

Elbert E. N. Macau, C. A. S. Batista, Antonio M. Batista, José D. Szezech, and Ricardo L. Viana

Subjects

Statistics and Probability, Physics, Coupling strength, business.industry, Phase (waves), Statistical and Nonlinear Physics, Phase oscillator, 01 natural sciences, Molecular physics, Coupling length, Synchronization (alternating current), Coupling (electronics), Control theory, Quantum mechanics, Synchronization (computer science), 0103 physical sciences, Telecommunications, business, 010306 general physics, 010301 acoustics

Abstract

We investigate the transition to phase and frequency synchronization in a one-dimensional chain of phase oscillator “cells” where the coupling is mediated by the local concentration of a chemical which can diffuse in the inter-oscillator medium and it is both secreted and absorbed by the oscillator “cells”, influencing their dynamical behavior. This coupling has the advantage of having a tunable parameter which makes it possible to pass continuously from a global (all-to-all) to a local (nearest-neighbor) coupling form. We have verified that synchronous behavior depends on the coupling strength and coupling length.

Published

2017

9. Using rotation number to detect sticky orbits in Hamiltonian systems

Author

José D. Szezech, Ricardo L. Viana, Michele Mugnaine, Antonio M. Batista, Iberê L. Caldas, and M. S. Santos

Subjects

Applied Mathematics, Small number, General Physics and Astronomy, Statistical and Nonlinear Physics, Lyapunov exponent, Standard map, FÍSICA DE PLASMAS, 01 natural sciences, 010305 fluids & plasmas, Hamiltonian system, Nonlinear system, symbols.namesake, Phase space, 0103 physical sciences, symbols, Statistical physics, 010306 general physics, Divergence (statistics), Mathematical Physics, Rotation number, Mathematics

Abstract

In Hamiltonian systems, depending on the control parameter, orbits can stay for very long times around islands, the so-called stickiness effect caused by a temporary trapping mechanism. Different methods have been used to identify sticky orbits, such as recurrence analysis, recurrence time statistics, and finite-time Lyapunov exponent. However, these methods require a large number of map iterations and to know the island positions in the phase space. Here, we show how to use the small divergence of bursts in the rotation number calculation as a tool to identify stickiness without knowing the island positions. This new procedure is applied to the standard map, a map that has been used to describe the dynamic behavior of several nonlinear systems. Moreover, our procedure uses a small number of map iterations and is proper to identify the presence of stickiness phenomenon for different values of the control parameter.

Published

2019

10. Dragon-kings death in nonlinear wave interactions

Author

Iberê L. Caldas, M. S. Santos, Antonio M. Batista, Ricardo L. Viana, Kelly C. Iarosz, and José D. Szezech

Subjects

Statistics and Probability, Physics, Phase transition, Work (thermodynamics), Extreme events, FOS: Physical sciences, Observable, Condensed Matter Physics, Small amplitude, Nonlinear Sciences - Chaotic Dynamics, 01 natural sciences, 010305 fluids & plasmas, Nonlinear system, SISTEMAS DISSIPATIVO, 0103 physical sciences, Statistical physics, Chaotic Dynamics (nlin.CD), Predictability, 010306 general physics

Abstract

Extreme events are by definition rare and exhibit unusual values of relevant observables. In literature, it is possible to find many studies about the predictability and suppression of extreme events. In this work, we show the existence of dragon-kings extreme events in nonlinear three-wave interactions. Dragon-king extreme events, identified by phase transitions, tipping points and catastrophes, affects fluctuating systems. We show that these events can be avoided by adding a perturbing small amplitude wave to the system.

Published

2019

11. Basin entropy behavior in a cyclic model of the rock-paper-scissors type

Author

Michele Mugnaine, Fabiano M. Andrade, José D. Szezech, and D. Bazeia

Subjects

Cyclic model, Statistical Mechanics (cond-mat.stat-mech), Computer science, Chaotic, General Physics and Astronomy, FOS: Physical sciences, Hamming distance, Structural basin, 01 natural sciences, 010305 fluids & plasmas, Biological Physics (physics.bio-ph), 0103 physical sciences, Quantitative Biology::Populations and Evolution, Statistical physics, Physics - Biological Physics, 010306 general physics, Condensed Matter - Statistical Mechanics

Abstract

We deal with stochastic network simulations in a model with three distinct species that compete under cyclic rules which are similar to the rules of the popular rock-paper-scissors game. We investigate the Hamming distance density and then the basin entropy behavior, running the simulations for some typical values of the parameters mobility, predation and reproduction and for very long time evolutions. The results show that the basin entropy is another interesting tool of current interest to investigate chaotic features of the network simulations that are usually considered to describe aspects of biodiversity in the cyclic three-species model., 7 pages, 7 figures, 2 tables. To appear in EPL

Published

2019

12. Numerical simulations of the linear drift memristor model

Author

T. L. Prado, Thiago F. P. da Silva, Antonio M. Batista, Clara M. dos Santos, Kelly C. Iarosz, Fabiano A. S. Ferrari, José D. Szezech, M. S. Santos, and Silvio L.T. de Souza

Subjects

010302 applied physics, Work (thermodynamics), Computer science, Spice, Complex system, General Physics and Astronomy, Linear drift, 02 engineering and technology, Memristor, 021001 nanoscience & nanotechnology, 01 natural sciences, law.invention, Set (abstract data type), law, 0103 physical sciences, Applied mathematics, Element (category theory), 0210 nano-technology

Abstract

Memristor is a passive element theoretically proposed by Leon Chua in the 1970’s. It started to receive attention after 2008, when researchers from the HP Labs presented a device with memristive properties. Since then, several models have been proposed to describe the memristor. In this work, we analyze the linear drift model, comparing the numerical solutions with analytical solutions and SPICE simulations. We demonstrate that different solutions can be found depending on the method and parameter set.

Published

2019

13. Fractal structures in the parameter space of nontwist area-preserving maps

Author

José D. Szezech, Ricardo L. Viana, A. C. Mathias, M. S. Santos, Iberê L. Caldas, and Michele Mugnaine

Subjects

Physics, Dynamical systems theory, Boundary (topology), FRACTAIS, Parameter space, 01 natural sciences, 010305 fluids & plasmas, Fractal, Uncertainty exponent, Phase space, 0103 physical sciences, Dissipative system, Statistical physics, Invariant (mathematics), 010306 general physics

Abstract

Fractal structures are very common in the phase space of nonlinear dynamical systems, both dissipative and conservative, and can be related to the final state uncertainty with respect to small perturbations on initial conditions. Fractal structures may also appear in the parameter space, since parameter values are always known up to some uncertainty. This problem, however, has received less attention, and only for dissipative systems. In this work we investigate fractal structures in the parameter space of two conservative dynamical systems: the standard nontwist map and the quartic nontwist map. For both maps there is a shearless invariant curve in the phase space that acts as a transport barrier separating chaotic orbits. Depending on the values of the system parameters this barrier can break up. In the corresponding parameter space the set of parameter values leading to barrier breakup is separated from the set not leading to breakup by a curve whose properties are investigated in this work, using tools as the uncertainty exponent and basin entropies. We conclude that this frontier in parameter space is a complicated curve exhibiting both smooth and fractal properties, that are characterized using the uncertainty dimension and basin and basin boundary entropies.

Published

2019

14. Dynamics of epidemics: Impact of easing restrictions and control of infection spread

Author

Silvio L.T. de Souza, José D. Szezech, Antonio M. Batista, Iberê L. Caldas, and Kelly C. Iarosz

Subjects

2019-20 coronavirus outbreak, Mathematical model, Coronavirus disease 2019 (COVID-19), Computer science, General Mathematics, Applied Mathematics, Severe acute respiratory syndrome coronavirus 2 (SARS-CoV-2), Epidemic dynamics, COVID-19, General Physics and Astronomy, Statistical and Nonlinear Physics, SEIR model, 01 natural sciences, Article, Spikes of infections, 010305 fluids & plasmas, 0103 physical sciences, Control of infection spread, Econometrics, Easing restrictions, 010301 acoustics

Abstract

Highlights • We investigate epidemic dynamics using a deterministic compartmental model and numerical simulations. • Examining the impact of easing restrictions on the infection rate for reopening the economy and society during COVID-19 pandemic. • A control strategy to suppress the spikes of infection cases for the period of easing containment measures., During an infectious disease outbreak, mathematical models and computational simulations are essential tools to characterize the epidemic dynamics and aid in design public health policies. Using these tools, we provide an overview of the possible scenarios for the COVID-19 pandemic in the phase of easing restrictions used to reopen the economy and society. To investigate the dynamics of this outbreak, we consider a deterministic compartmental model (SEIR model) with an additional parameter to simulate the restrictions. In general, as a consequence of easing restrictions, we obtain scenarios characterized by high spikes of infections indicating significant acceleration of the spreading disease. Finally, we show how such undesirable scenarios could be avoided by a control strategy of successive partial easing restrictions, namely, we tailor a successive sequence of the additional parameter to prevent spikes in phases of low rate of transmissibility.

Published

2021

15. Transient chaotic transport in dissipative drift motion

Author

Antonio M. Batista, Iberê L. Caldas, R.S. Oyarzabal, José D. Szezech, Miguel A. F. Sanjuán, Ricardo L. Viana, and S.L.T. de Souza

Subjects

Physics, Periodic attractor, Chaotic, General Physics and Astronomy, Motion (geometry), Lyapunov exponent, Plasma, Dissipation, 01 natural sciences, 010305 fluids & plasmas, Nonlinear Sciences::Chaotic Dynamics, symbols.namesake, Classical mechanics, 0103 physical sciences, symbols, Dissipative system, Transient (oscillation), 010306 general physics

Abstract

We investigate chaotic particle transport in magnetised plasmas with two electrostatic drift waves. Considering dissipation in the drift motion, we verify that the removed KAM surfaces originate periodic attractors with their corresponding basins of attraction. We show that the properties of the basins depend on the dissipation and the space-averaged escape time decays exponentially when the dissipation increases. We find positive finite time Lyapunov exponents in dissipative drift motion, consequently the trajectories exhibit transient chaotic transport. These features indicate how the transient plasma transport depends on the dissipation.

Published

2016

16. Tilted-hat mushroom billiards: Web-like hierarchical mixed phase space

Author

Kelly C. Iarosz, J. A. Méndez-Bermúdez, Diogo Ricardo da Costa, Matheus S. Palmero, Antonio M. Batista, José D. Szezech, Universidade de São Paulo (USP), Universidade Estadual de Ponta Grossa (UEPG), Benemérita Universidad Autónoma de Puebla, Federal Technological University of Paraná, and Universidade Estadual Paulista (Unesp)

Subjects

Physics, Numerical Analysis, Mushroom, Mathematics::Dynamical Systems, Mushroom billiards, Applied Mathematics, Chaotic, Structure (category theory), Geometry, Space (mathematics), 01 natural sciences, 010305 fluids & plasmas, Nonlinear Sciences::Chaotic Dynamics, Nonlinear system, Nonlinear dynamics, Modeling and Simulation, Phase space, 0103 physical sciences, Chaos, Mixed phase, Dynamical billiards, 010306 general physics

Abstract

Made available in DSpace on 2020-12-12T02:16:10Z (GMT). No. of bitstreams: 0 Previous issue date: 2020-12-01 Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP) Vicerrectoría de Investigación y Estudios de Posgrado, Benemérita Universidad Autónoma de Puebla Secretaría de Educación Pública Mushroom billiards are formed, generically, by a semicircular hat attached to a rectangular stem. The dynamics of mushroom billiards shows a continuous transition from integrability to chaos. However, between those limits the phase space is sharply divided in two components corresponding to regular and chaotic orbits, in contrast to most mixed phase space billiards. In this paper we show that tilting the hat of a mushroom billiard produces a highly non-trivial (i.e. non-KAM) mixed phase space. Moreover, for small tilting, this phase space shows a web-like hierarchical structure. Institute of Mathematics and Statistics University of São Paulo Postgraduate program in Science/Physics State University of Ponta Grossa (UEPG) Institute of Physics University of São Paulo (USP) Departamento de Matemática Aplicada e Estatística Instituto de Ciências Matemáticas e de Computação Universidade de São Paulo - Campus de São Carlos, Caixa Postal 668 Instituto de Física Benemérita Universidad Autónoma de Puebla, Apartado Postal J-48 Graduate Program in Chemical Engineering Federal Technological University of Paraná Departament of Mathematics and Statistics State University of Ponta Grossa (UEPG) Departamento de Física Universidade Estadual Paulista (UNESP) Instituto de Geociências e Ciências Exatas, Campus Rio Claro, Av. 24A, 1515 Departamento de Física Universidade Estadual Paulista (UNESP) Instituto de Geociências e Ciências Exatas, Campus Rio Claro, Av. 24A, 1515 Vicerrectoría de Investigación y Estudios de Posgrado, Benemérita Universidad Autónoma de Puebla: 100405811-VIEP2019 FAPESP: 2015/07311-7 FAPESP: 2018/03000-5 FAPESP: 2018/03211-6 FAPESP: 2019/06931-2 FAPESP: 2020/02415-7 Secretaría de Educación Pública: 511-6/2019.-11821

Published

2020

17. Recurrence quantification analysis for the identification of burst phase synchronisation

Author

Antonio M. Batista, Jürgen Kurths, Iberê L. Caldas, Rafael R. Borges, Elbert E. N. Macau, P. R. Protachevicz, Serhiy Yanchuk, E. L. Lameu, Kelly C. Iarosz, Fernando S. Borges, José D. Szezech, and Ricardo L. Viana

Subjects

Small-world network, Quantitative Biology::Neurons and Cognition, Artificial neural network, business.industry, Computer science, Applied Mathematics, Burst phase, Phase (waves), Chaotic, General Physics and Astronomy, Statistical and Nonlinear Physics, Rulkov map, Pattern recognition, 01 natural sciences, Expression (mathematics), 010305 fluids & plasmas, Recurrence quantification analysis, 0103 physical sciences, Artificial intelligence, 010306 general physics, business, Mathematical Physics

Abstract

In this work, we apply the spatial recurrence quantification analysis (RQA) to identify chaotic burst phase synchronisation in networks. We consider one neural network with small-world topology and another one composed of small-world subnetworks. The neuron dynamics is described by the Rulkov map, which is a two-dimensional map that has been used to model chaotic bursting neurons. We show that with the use of spatial RQA, it is possible to identify groups of synchronised neurons and determine their size. For the single network, we obtain an analytical expression for the spatial recurrence rate using a Gaussian approximation. In clustered networks, the spatial RQA allows the identification of phase synchronisation among neurons within and between the subnetworks. Our results imply that RQA can serve as a useful tool for studying phase synchronisation even in networks of networks.

Published

2018

18. Dynamical characterization of transport barriers in nontwist Hamiltonian systems

Author

Michele Mugnaine, M. S. Santos, Antonio M. Batista, R. L. Viana, A. C. Mathias, and José D. Szezech

Subjects

Physics, Chaotic, Boundary (topology), Flux, 01 natural sciences, 010305 fluids & plasmas, Hamiltonian system, Turnstile, Uncertainty exponent, 0103 physical sciences, Statistical physics, Homoclinic orbit, Twist, 010306 general physics

Abstract

The turnstile provides us a useful tool to describe the flux in twist Hamiltonian systems. Thus, its determination allows us to find the areas where the trajectories flux through barriers. We show that the mechanism of the turnstile can increase the flux in nontwist Hamiltonian systems. A model which captures the essence of these systems is the standard nontwist map, introduced by del Castillo-Negrete and Morrison. For selected parameters of this map, we show that chaotic trajectories entering in resonances zones can be explained by turnstiles formed by a set of homoclinic points. We argue that for nontwist systems, if the heteroclinic points are sufficiently close, they can connect twin-islands chains. This provides us a scenario where the trajectories can cross the resonance zones and increase the flux. For these cases the escape basin boundaries are nontrivial, which demands the use of an appropriate characterization. We applied the uncertainty exponent and the entropies of the escape basin boundary in order to quantify the degree of unpredictability of the asymptotic trajectories.

Published

2018

19. Mathematical Model with Autoregressive Process for Electrocardiogram Signals

Author

Antonio M. Batista, Moacir Fernandes de Godoy, Ronaldo M. Evaristo, Kelly C. Iarosz, Ricardo L. Viana, and José D. Szezech

Subjects

Heartbeat, FOS: Physical sciences, 030204 cardiovascular system & hematology, 01 natural sciences, 010305 fluids & plasmas, 03 medical and health sciences, 0302 clinical medicine, 0103 physical sciences, Statistics, Mathematics, Numerical Analysis, business.industry, Applied Mathematics, Pattern recognition, Computational Physics (physics.comp-ph), Physics - Medical Physics, Coupled differential equations, Autoregressive model, Modeling and Simulation, cardiovascular system, Poincaré plot, Artificial intelligence, Medical Physics (physics.med-ph), business, Physics - Computational Physics, circulatory and respiratory physiology

Abstract

The cardiovascular system is composed of the heart, blood and blood vessels. Regarding the heart, cardiac conditions are determined by the electrocardiogram, that is a noninvasive medical procedure. In this work, we propose autoregressive process in a mathematical model based on coupled differential equations in order to obtain the tachograms and the electrocardiogram signals of young adults with normal heartbeats. Our results are compared with experimental tachogram by means of Poincare plot and dentrended fluctuation analysis. We verify that the results from the model with autoregressive process show good agreement with experimental measures from tachogram generated by electrical activity of the heartbeat. With the tachogram we build the electrocardiogram by means of coupled differential equations.

Published

2017

20. Recurrence-based analysis of barrier breakup in the standard nontwist map

Author

José D. Szezech, M. S. Santos, Antonio M. Batista, Ricardo L. Viana, Michele Mugnaine, Murilo S. Baptista, and Iberê L. Caldas

Subjects

Applied Mathematics, Critical phenomena, Chaotic, General Physics and Astronomy, Statistical and Nonlinear Physics, Parameter space, Breakup, 01 natural sciences, 010305 fluids & plasmas, Nonlinear Sciences::Chaotic Dynamics, Phase space, 0103 physical sciences, Statistical physics, Invariant (mathematics), 010306 general physics, Recurrence plot, Mathematical Physics, Bifurcation, Mathematics

Abstract

We study the standard nontwist map that describes the dynamic behaviour of magnetic field lines near a local minimum or maximum of frequency. The standard nontwist map has a shearless invariant curve that acts like a barrier in phase space. Critical parameters for the breakup of the shearless curve have been determined by procedures based on the indicator points and bifurcations of periodical orbits, a methodology that demands high computational cost. To determine the breakup critical parameters, we propose a new simpler and general procedure based on the determinism analysis performed on the recurrence plot of orbits near the critical transition. We also show that the coexistence of islands and chaotic sea in phase space can be analysed by using the recurrence plot. In particular, the measurement of determinism from the recurrence plot provides us with a simple procedure to distinguish periodic from chaotic structures in the parameter space. We identify an invariant shearless breakup scenario, and we also show that recurrence plots are useful tools to determine the presence of periodic orbit collisions and bifurcation curves.

Published

2018