The Verhulst-Like Equations: Integrable OΔE and ODE with Chaotic Behavior

Andrianov, Igor V.; Starushenko, Galina A.; Kvitka, Sergiy; Khajiyeva, Lelya

doi:10.3390/sym11121446

Cited by 6 publications

(8 citation statements)

References 13 publications

(39 reference statements)

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“…on the total number of cases (N)left, and on the time (t)right, in the framework of the generalized logistic model (14) for Austria, Switzerland and South Korea (top to bottom). Fig.…”

Section: Generalized Logistic Modelmentioning

confidence: 99%

Logistic equation and COVID-19

Pelinovsky

Kurkin

Kurkina

et al. 2020

Chaos, Solitons & Fractals

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“…on the total number of cases (N)left, and on the time (t)right, in the framework of the generalized logistic model (14) for Austria, Switzerland and South Korea (top to bottom). Fig.…”

Section: Generalized Logistic Modelmentioning

confidence: 99%

Logistic equation and COVID-19

Pelinovsky

Kurkin

Kurkina

et al. 2020

Chaos, Solitons & Fractals

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“…Proof. To demonstrate the nonlinear behavior (chaotic behavior) in (5), it is mandatory that the instability measure ρ defined in (12) is nonnegative. When considering q = 0.95, a 7 = 2.4, and w = 100, the characteristic equation at the equilibrium point E 1 = (0.802,…”

Section: Hypoglycemia: Parameter a 1 As A Function Of Fractional-order Qmentioning

confidence: 99%

“…This rise is primarily due to the rise in T2DM and factors driving it, including overweight and obesity. Diverse mathematical models using ODEs and OdEs have provided a common path to understand multiple complex systems [5,6]. In the last years, because of the long-memory of fractional-order operators, fractional-order systems have gained extensive attention for describing and understanding physical and biological systems [5,[7][8][9][10].…”

Section: Introductionmentioning

confidence: 99%

“…Diverse mathematical models using ODEs and OdEs have provided a common path to understand multiple complex systems [5,6]. In the last years, because of the long-memory of fractional-order operators, fractional-order systems have gained extensive attention for describing and understanding physical and biological systems [5,[7][8][9][10]. For instance, the analysis of diverse biological systems, such as bio-impedance, drug diffusion, respiratory tissue, and so forth, was reported in [11] using fractional calculus.…”

Section: Introductionmentioning

confidence: 99%

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The Effect of a Non-Local Fractional Operator in an Asymmetrical Glucose-Insulin Regulatory System: Analysis, Synchronization and Electronic Implementation

2020

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For studying biological conditions with higher precision, the memory characteristics defined by the fractional-order versions of living dynamical systems have been pointed out as a meaningful approach. Therefore, we analyze the dynamics of a glucose-insulin regulatory system by applying a non-local fractional operator in order to represent the memory of the underlying system, and whose state-variables define the population densities of insulin, glucose, and β-cells, respectively. We focus mainly on four parameters that are associated with different disorders (type 1 and type 2 diabetes mellitus, hypoglycemia, and hyperinsulinemia) to determine their observation ranges as a relation to the fractional-order. Like many preceding works in biosystems, the resulting analysis showed chaotic behaviors related to the fractional-order and system parameters. Subsequently, we propose an active control scheme for forcing the chaotic regime (an illness) to follow a periodic oscillatory state, i.e., a disorder-free equilibrium. Finally, we also present the electronic realization of the fractional glucose-insulin regulatory model to prove the conceptual findings.

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“…Establishing a relationship between discrete and continuous models, i.e., between nonlocal (difference or integral) and local (differential) operators, is nontrivial and interesting problem [2]. Both the problems of discretization of continuous systems and the continualization of discrete systems are important [3]. Among these problems is the approximation of nonlocal theories by gradient ones while preserving the key features of discrete systems.…”

Section: Introductionmentioning

confidence: 99%

Transition from Discrete to Continuous Media: The Impact of Symmetry Changes on Asymptotic Behavior of Waves

Andrianov

Koblik²,

Starushenko

2021

Symmetry

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This paper is devoted to comparing the asymptotics of a solution, describing the wave motion of a discrete lattice and its continuous approximations. The transition from a discrete medium to a continuous one changes the symmetry of the system. The influence of this change on the asymptotic behavior of waves is of great interest. For the discrete case, Schrödinger’s analytical solution of the initial-value problem for the Lagrange lattice is used. Various continuous approximations are proposed to approximate the lattice. They are based on Debye’s concept of quasicontinuum. The asymptotics of the initial motion and the behavior of the systems in the vicinity of the quasifront and at large times are compared. The approximations of phase and group velocities is analyzed. The merits and limitations of the described approaches are discussed.

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The Verhulst-Like Equations: Integrable OΔE and ODE with Chaotic Behavior

Cited by 6 publications

References 13 publications

Logistic equation and COVID-19

Logistic equation and COVID-19

The Effect of a Non-Local Fractional Operator in an Asymmetrical Glucose-Insulin Regulatory System: Analysis, Synchronization and Electronic Implementation

Transition from Discrete to Continuous Media: The Impact of Symmetry Changes on Asymptotic Behavior of Waves

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