Coexistence of Multiple Points, Limit Cycles, and Strange Attractors in a Simple Autonomous Hyperjerk Circuit with Hyperbolic Sine Function

The heart has a leading and vital role in the human body, scientific researches dealing with this theme are sources of growing interest. In recent years, several mathematical models of the heart electrical conduction system have appeared in the scientific literature. In the present paper, the nonlinear dynamics of a heart’s electrical conduction system model is investigated. The model consists of three coupled nonlinear oscillators with time delay coupling as earlier proposed by Gois et al[1]. Our study here is both theoretical and experimental; theoretical study includes fixed points analysis, bifurcations analysis where the effect of some parameters on the system dynamics is investigated, coexisting bifurcations and hysteresis phenomenon are found for some range of the system parameters, Lyapunov exponents and basin of attraction calculation. The experimental study includes sizing an analog implementation of the mathematical model using OrCAD/Pspice software, as well as the practical realisation of the model. Experimental and practical results are then presented in order to confirm theoretical predictions.Keywords: Heart, Electrical Cardiac conduction system, Electrocardiogram, Modified Van der Pol oscillators, Bifurcation, Chaos, OrCAD/Pspice Simulations.

Section: Experimental Studymentioning

confidence: 74%

On the nonlinear dynamics of a cardiac electrical conduction system model: theoretical and experimental study

Kuate¹,

Fotsin²

2022

“…Moreover, multistability of four period-3 limit cycles, coexisting with two period-1 limit cycles, and four chaotic attractors obtain for a = 1.1185 with their corresponding cross of basins of attractions. Multistability of up to ten attractors is rarely present in literature [43].…”

Section: Coexistence Of Double-scroll Attractorsmentioning

confidence: 99%

Collective dynamics of two coupled Hopfield inertial neurons with different activation functions: theoretical study and microcontroller implementation

Madasamy,

Boui a Boya,

Kengne

et al. 2023

This work deals with the regular and chaotic dynamics of a system made up of two Hopfield-type neurons with two different activation functions: the hyperbolic tangent function and the Crespi function. The mathematical model is in the form of an autonomous differential system of order four with odd symmetry. The analysis highlights nine equilibrium points and four of these points experience a Hopf bifurcation at the same critical value of a control parameter which can be either the diss1ipation parameter or one of the coupling coefficients. This makes plausible the presence of four parallel bifurcation branches as well as the coexistence of multiple attractors in the behavior of the system. One of the highlights revealed in this work is the coexistence of three double-scroll type attractors of particular topology as well as the presence of a four-spiral attractor. Furthermore, the coexistence of both self-excited and hidden dynamics is also reported. All this plethora of dynamics is elucidated by making use of the usual tools for analyzing nonlinear systems such as bifurcation diagrams, the maximum of Lyapunov exponent, basins of attractions as well as phase portraits. A physical implementation of the microcontroller-based system is envisaged in order to confirm the plethora of behaviors observed theoretically.

“…Some nonlinear systems are able to generate several forms of complex behaviours such as chaos, hyperchaos, intermittency, multistability, bursting oscillations, antimonotonicity, offset boosting, and total amplitude control [9][10][11]. Tsotsop et al, in 2020 explored the dynamics behaviors of an elegant snap system with hyperbolic sine nonlinearity and shows the coexistence of self-excited chaotic attractors and stable fixed points, including the coexistence of up to ten different attractors [12]. In recent years, many studies have been made on cyclic systems.…”

Section: Introductionmentioning

confidence: 99%

Adjustable symmetry on the dynamics of a new chaotic system with cyclic symmetry: theoretical study, control and experimental investigation

Boya

Kengne

2023

In this study, we propose a new chaotic autonomous system with adjustable cyclic and central symmetries. The new 3D system, with rich dynamics, is constructed based on the Thomas model. A detailed study of the nonlinear dynamics arising from the model allows us to reveal complex behaviors of different phenomena such as hysteresis dynamics, offset boosting, total amplitude control, and coexistence of several homogeneous and heterogeneous attractors in both regimes (symmetric and asymmetric). The control of multistability of the new cyclic system is studied by following the technique of linear augmentation. An analog electronic version of the model is designed and then simulated using the Pspice software. Moreover, a physical implementation using the Arduino microcontroller makes it possible to validate the results of the theoretical analysis.