Your search keyword '"saddle-node bifurcation"' showing total 6,238 results

1. Reduced-Order Models of Islanded Microgrid with Multiple Grid-Forming Converters

Author

Yang, Jingxi, Tse, Chi Kong, Yang, Jingxi, and Tse, Chi Kong

Published

2025

2. Routes to Voltage Instability in Rectifier-Based Systems

Author

Yang, Jingxi, Tse, Chi Kong, Yang, Jingxi, and Tse, Chi Kong

Published

2025

3. Euler-buckled beam based nonlinear energy sink for vibration reduction of flywheel system under different excitations.

Author

Liu, Haiping, Zhang, Jun, Shen, Dashan, and Xiao, Kaili

Subjects

*RUNGE-Kutta formulas, *HOPF bifurcations, *FLYWHEELS, *FREQUENCY stability, *DYNAMIC models

Abstract

This study develops a new class of Euler-buckled beam based nonlinear energy sink (EBNES) with three configurations, which is expected to attenuate the disturbance effects and further enhance vibration suppression under launching and on-orbit loads simultaneously. The effects of different arrangements on amplitude-frequency responses of the primary system are derived and analyzed through complexification-averaging method, and the approximate solutions are verified by fourth-order Runge Kutta method. Comparison results exhibit that the EBNES-I is much more effective with enhanced vibration reduction performance and stability in a broad frequency range. Furthermore, a two-degree-of-freedom dynamic model of the flywheel system, which integrates the EBNES-I and the supporting structure in satellite, is established. The vibration reduction and bifurcation behaviors of the proposed EBNES-I are investigated, and the efficiency of the proposed EBNES-I in vibration reduction of the flywheel is compared to that of a traditional cubic-stiffness-type NES. It is found that the EBNES-I exhibits a good vibration reduction performance on the dynamic responses of the flywheel system in launching and on-orbit stage simultaneously. Additionally, the bifurcations of the coupled system are studied in order to investigate the influences of gravity and excitation amplitudes on the stability of the EBNES. Calculation results provide conditions for occurrence of the saddle-node (SN) and Hopf bifurcations. [ABSTRACT FROM AUTHOR]

Published

2024

4. The impact of harvesting on the evolutionary dynamics of prey species in a prey-predator systems.

Author

Bandyopadhyay, Richik and Chattopadhyay, Joydev

Abstract

Matsuda and Abrams (Theor Popul Biol 45(1):76–91, 1994) initiated the exploration of self-extinction in species through evolution, focusing on the advantageous position of mutants near the extinction boundary in a prey-predator system with evolving foraging traits. Previous models lacked theoretical investigation into the long-term effects of harvesting. In our model, we introduce constant-effort prey and predator harvesting, along with individual logistic growth of predators. The model reveals two distinct evolutionary outcomes: (i) Evolutionary suicide, marked by a saddle-node bifurcation, where prey extinction results from the invasion of a lower forager mutant; and (ii) Evolutionary reversal, characterized by a subcritical Hopf bifurcation, leading to cyclic prey evolution. Employing an innovative approach based on Gröbner basis computation, we identify various bifurcation manifolds, including fold, transcritical, cusp, Hopf, and Bogdanov-Takens bifurcations. These contrasting scenarios emerge from variations in harvesting parameters while keeping other factors constant, rendering the model an intriguing subject of study. [ABSTRACT FROM AUTHOR]

Published

2024

5. Bistability and bifurcations for a food chain model with nonlinear harvesting of top predator.

Author

Wang, Shaoli, Chai, Nannan, Wang, Xiao, and Xu, Fei

Subjects

*TOP predators, *HOPF bifurcations, *FOOD chains, *DISPLAY systems, *COMPUTER simulation

Abstract

In this paper, we study a prey–predator–top predator food chain model with nonlinear harvesting of top predator. We have derived two important thresholds: the top predator extinction threshold and the coexistence threshold. We found that the top predator will die out if the nonlinear harvesting from predator to top predator is larger than the top predator extinction threshold. On the other hand, the prey, predator and top predator coexist if the nonlinear harvesting from predator to top predator is less than the coexistence threshold. While the parameter value of nonlinear harvesting from predator to top predator is between two critical thresholds, the system displays bistability phenomena, implying that the top predator species either die out or exist with the prey and predator species, which largely depend on the initial condition. Thus, a bistable interval exists between two critical thresholds, which is a significant phenomenon for the model. Meanwhile, we performed bifurcation analysis for the model, showing that the system would arise backward/forward bifurcation and saddle-node bifurcation and Hopf bifurcation. Finally, we performed numerical simulations to verify the theoretical analysis. [ABSTRACT FROM AUTHOR]

Published

2024

6. Dynamic Responses and Nonlinear Characteristics of a Nonlinear Absorber with Euler-Buckled Beams for Spacecraft Flywheel Systems.

Author

Zhang, Jun, Liu, Haiping, Shen, Dashan, and Quan, Chunri

Subjects

*NONLINEAR dynamical systems, *STRUCTURAL plates, *VIBRATION absorbers, *HOPF bifurcations, *NONLINEAR systems, *FLYWHEELS

Abstract

In order to effectively mitigate the micro-vibration energy from the on-orbit flywheel and high-level vibration transmitted to flywheel system in the launching stage, a nonlinear vibration absorber (NVA) with Euler-buckled beams is developed and investigated in this paper. The NVA is composed of a linear supporting spring and a set of parallel Euler-buckled beams which is used as a negative stiffness corrector. In order to evaluate vibration reduction performance and stability characteristics of this developed nonlinear coupled dynamic system with NVA. First of all, a multi-degree-of-freedom compound dynamic model, including the flywheel system, the NVA and the supporting structural plate in the satellite platform, is built. Then, based on the systematic dynamic equations, the approximate steady-state solutions are derived by using the complexification-averaging (CX-A) method under on-orbit and launching loads, respectively. The analytical method and solutions are validated by using the numerical method. The proposed NVA can realize excellent vibration mitigation performance for the three-degree-of-freedom (3-DOF) coupled nonlinear system under the launching and on-orbit excitations. Next, the slow-variable manifold equation is analyzed to address the dynamic bifurcation behaviors of the nonlinear compound system and the influences of the excitation amplitude on the bifurcation characteristics are focused on. The results show that a 3-DOF system is more prone to instability and requires larger external excitation to escape the instability region. The calculation results also show that the stiffness ratio and excitation amplitude have significant effects on the bifurcation characteristics, and a proper stiffness ratio can be chosen to avoid bifurcations. Finally, compared with typical pure cubic stiffness NVA, the proposed NVA exhibits greater adaptability, and can work efficiently for a relatively larger range of excitation amplitude. [ABSTRACT FROM AUTHOR]

Published

2024

7. Dynamic analysis of a novel SI network rumour propagation model with self-regulatory mechanism.

Author

Liu, Ying, Ke, Yue, Zhang, Zhengdi, and Zhu, Linhe

Subjects

*RUMOR, *ORDINARY differential equations, *FUNCTIONAL analysis

Abstract

In our modern world, rumours have triggered chaos and conflicts. Study of the dynamics of rumor propagation helps yield effective countermeasures to resist rumour propagation. It is a major task to study an ordinary differential equation (ODE) model on high-order incidence and treatment function for its dynamical behaviours. First and foremost, we build an ODE model depending on the actual transmission mechanism. Secondly, we study the basic properties of solutions including non-negativity, boundedness and situation of inexistence of the limit cycle. Thirdly, we study the necessary conditions of the equilibrium points for the existence, stability and instability. Furthermore, this study analyses bifurcations induced by parameters around the equilibrium point of rumour-spreading. Finally, several numerical simulations are given to show diverse dynamics behaviours of the model on different parameters and the factors affecting rumour propagation are theoretically analysed, which proves the validity of the theoretical analysis. [ABSTRACT FROM AUTHOR]

Published

2024

8. Dynamical Analysis of an Allelopathic Phytoplankton Model with Fear Effect.

Author

Chen, Shangming, Chen, Fengde, Srivastava, Vaibhava, and Parshad, Rana D.

Abstract

This paper is the first to propose an allelopathic phytoplankton competition ODE model influenced by the fear effect based on natural biological phenomena. It is shown that the interplay of this fear effect and the allelopathic term cause rich dynamics in the proposed competition model, such as global stability, transcritical bifurcation, pitchfork bifurcation, and saddle-node bifurcation. We also consider the spatially explicit version of the model and prove analogous results. Numerical simulations verify the feasibility of the theoretical analysis. The results demonstrate that the primary cause of the extinction of non-toxic species is the fear of toxic species compared to toxins. Allelopathy only affects the density of non-toxic species. The discussion guides the conservation of species and the maintenance of biodiversity. [ABSTRACT FROM AUTHOR]

Published

2024

9. Stability and Bifurcation Analysis of Commensal Symbiosis System with the Allee Effect and Single Feedback Control.

Author

Lili Xu, Yalong Xue, Qifa Lin, and Fengde Chen

Subjects

*ALLEE effect, *COMMENSALISM, *SYMBIOSIS, *COMPUTER simulation, *EQUILIBRIUM

Abstract

The commensal symbiosis system with the Allee effect and single feedback control is proposed and analyzed in this paper. The stability analysis of all possible equilibrium points is discussed, and the sufficient conditions for global stability of the interior equilibrium points are obtained. The occurrence of transcritical bifurcation and saddle-node bifurcation around the equilibrium points is investigated. Finally, the main results of the model are illustrated by numerical simulations. [ABSTRACT FROM AUTHOR]

Published

2024

10. Stability switches via endemic bubbles in a COVID-19 model examining the effect of mask usage and saturated treatment with reinfection.

Author

Devi, Arpita, Adak, Asish, and Gupta, Praveen Kumar

Abstract

We propose a population dynamical model for SARS-CoV-2 that takes into account mask compliance and effectiveness, in the context of saturated treatment. This model also considers reinfection and relapse among individuals with comorbidities. Our findings indicate that global mask usage, in conjunction with other public health measures, effectively reduces the basic reproduction number ( R 0 ). We establish the local and conditional global stability of the disease-free equilibrium point. Notably, the model exhibits intriguing behavior due to saturated treatment and reinfection. Under specific parameter conditions, it demonstrates multiple endemic equilibria when R 0 < 1 resulting and backward and forward bifurcation. We conduct sensitivity analysis to pinpoint the key factors influencing disease spread. The existence of multiple equilibria contributes to intricate and diverse dynamics, showcasing a variety of bifurcations and oscillations through Hopf bifurcation. Under specific conditions, global asymptotic stability for the unique endemic equilibrium, when it exists, is established. Among further nonlinear dynamics exhibited by the proposed model, we establish backward Hopf bifurcation, Hopf–Hopf bifurcation and saddle-node bifurcation. Bistability of the equilibrium points is also observed through forward hysteresis. Additionally we provide the impact of parameters most effective in reducing in COVID-19 spread. Numerical simulations of the theoretical findings are offered to validate the results. [ABSTRACT FROM AUTHOR]

Published

2024

11. Bifurcation analysis of a Leslie-type predator-prey system with prey harvesting and group defense.

Author

Yongxin Zhang, Jianfeng Luo, Jun Hu, and Kaifa Wang

Subjects

PREDATION, LOTKA-Volterra equations, STOCHASTIC analysis, LIMIT cycles, JACOBIAN matrices, ALLEE effect, BIFURCATION diagrams, BIOLOGICAL extinction

Abstract

In this paper, we investigate a Leslie-type predator-prey model that incorporates prey harvesting and group defense, leading to a modified functional response. Our analysis focuses on the existence and stability of the system's equilibria, which are essential for the coexistence of predator and prey populations and the maintenance of ecological balance. We identify the maximum sustainable yield, a critical factor for achieving this balance. Through a thorough examination of positive equilibrium stability, we determine the conditions and initial values that promote the survival of both species. We delve into the system's dynamics by analyzing saddle-node and Hopf bifurcations, which are crucial for understanding the system transitions between various states. To evaluate the stability of the Hopf bifurcation, we calculate the first Lyapunov exponent and offer a quantitative assessment of the system's stability. Furthermore, we explore the Bogdanov-Takens (BT) bifurcation, a co-dimension 2 scenario, by employing a universal unfolding technique near the cusp point. This method simplifies the complex dynamics and reveals the conditions that trigger such bifurcations. To substantiate our theoretical findings, we conduct numerical simulations, which serve as a practical validation of the model predictions. These simulations not only confirm the theoretical results but also showcase the potential of the model for predicting real-world ecological scenarios. This in-depth analysis contributes to a nuanced understanding of the dynamics within predator-prey interactions and advances the field of ecological modeling. [ABSTRACT FROM AUTHOR]

Published

2024

12. Local and Global Dynamics of a Ratio-Dependent Holling–Tanner Predator–Prey Model with Strong Allee Effect.

Author

Lou, Weiping, Yu, Pei, Zhang, Jia-Fang, and Arancibia-Ibarra, Claudio

Subjects

*ALLEE effect, *HOPF bifurcations, *PREDATION, *LYAPUNOV stability, *SYSTEM dynamics, *GLOBAL asymptotic stability

Abstract

In this paper, the impact of the strong Allee effect and ratio-dependent Holling–Tanner functional response on the dynamical behaviors of a predator–prey system is investigated. First, the positivity and boundedness of solutions of the system are proved. Then, stability and bifurcation analysis on equilibria is provided, with explicit conditions obtained for Hopf bifurcation. Moreover, global dynamics of the system is discussed. In particular, the degenerate singular point at the origin is proved to be globally asymptotically stable under various conditions. Further, a detailed bifurcation analysis is presented to show that the system undergoes a codimension- 1 Hopf bifurcation and a codimension- 2 cusp Bogdanov–Takens bifurcation. Simulations are given to illustrate the theoretical predictions. The results obtained in this paper indicate that the strong Allee effect and proportional dependence coefficient have significant impact on the fundamental change of predator–prey dynamics and the species persistence. [ABSTRACT FROM AUTHOR]

Published

2024

13. Dynamics and Chaos of Convective Fluid Flow.

Author

Guo, Siyu and Luo, Albert C. J.

Subjects

*CONVECTIVE flow, *PERIODIC motion, *FLUID flow, *STEADY-state flow, *DYNAMICAL systems, *FLUID-structure interaction

Abstract

In this paper, a mathematical model of fluid flows in a convective thermal system is developed, and a five-dimensional dynamical system is developed for the investigation of the convective fluid dynamics. The analytical solutions of periodic motions to chaos of the convective fluid flows are developed for steady-state vortex flows, and the corresponding stability and bifurcations of periodic motions in the five-dimensional dynamical system are studied. The harmonic frequency-amplitude characteristics for periodic flows are obtained, which provide energy distribution in the parameter space. Analytical homoclinic orbits for the convective fluid flow systems are developed for the asymptotic convection through the infinite-many homoclinic orbits in the five-dimensional dynamical system. The dynamics of fluid flows in the convective thermal systems are revealed, and one can use such methodology to predict atmospheric and oceanic phenomena through thermal convections. [ABSTRACT FROM AUTHOR]

Published

2024

14. Bifurcation Analysis in a Coffee Berry-Borer-and-Ants Prey–Predator Model.

Author

Trujillo-Salazar, Carlos Andrés, Olivar-Tost, Gerard, and Sotelo-Castelblanco, Deissy Milena

Subjects

*COFFEE beans, *LIFE cycles (Biology), *BIOLOGICAL pest control agents, *ORDINARY differential equations, *NONLINEAR differential equations, *AGRICULTURE, *COFFEE growing

Abstract

One of the most important agricultural activities worldwide, coffee cultivation, is severely affected by the Coffee Berry Borer (CBB), Hypothenemus hampei, considered the primary coffee pest. The CBB is a tiny beetle that diminishes the quantity and quality of coffee beans by penetrating them to feed on the endosperm and deposit its eggs, continuing its life cycle. One strategy to combat CBBs is using biological control agents, such as certain species of ants. Here, a mathematical model (consisting of a system of nonlinear ordinary differential equations) is formulated to describe the prey–predator interaction between CBBs and an unspecified species of ants. From this mathematical perspective, the model allows us to determine conditions for the existence and stability of extinction, persistence or co-existence equilibria. Transitions among those equilibrium states are investigated through the maximum per capita consumption rate of the predator as a bifurcation parameter, allowing us to determine the existence of transcritical and saddle-node bifurcations. Phase portraits of the system are presented for different values of bifurcation parameter, to illustrate stability outcomes and the occurrence of bifurcations. It is concluded that an increase in bifurcation parameters significantly reduces the CBB population, suggesting that ant predation is an effective control strategy, at least theoretically. [ABSTRACT FROM AUTHOR]

Published

2024

15. Self-sustained dynamics by modeling competing PHA-producers and non-PHA-producers bacteria population for a limited resource: local and homoclinic bifurcation analysis.

Author

Tagne Nkounga, I. B., Bauda, P., Yamapi, R., and Camara, B. I.

Abstract

We propose a mathematical model for two species competing for a limited resource associated to polyhydroxyalkanoate (PHA) production, which possesses regime of stable states: stable equilibrium, and periodic and aperiodic oscillations. Such regimes of stable oscillations are absent in the model without taking into account PHA production but is known to exist in experimental model associated to the production of PHA. It explains the capacity of the system to sustain itself at the lowest value of resource. Thus, the proposed system provides a simpler four-dimensional model containing monod functions with such behaviours. Using analytical tools and numerical bifurcation analysis, we describe parameter regions and bifurcation structures leading to the existence and the coexistence between stable, unstable equilibrium and limit cycle. These explain critical parameter sensitivity impact on the process. Considering the effects on the proposed system under a frequent alternation of the input resource, we investigate how the increase of the length of the feast period in the Feast-Famine conditions, increases the PHA-production or decreases the lowest value of the resource at the equilibrium. [ABSTRACT FROM AUTHOR]

Published

2024

16. The effect of human heterogeneity on the transmission of viral respiratory diseases under air pollution.

Author

Qian, Shiwen, Wang, Jing, and Qi, Longxing

Subjects

*EMISSIONS (Air pollution), *VIRAL transmission, *AIR pollutants, *AIR pollution, *RESPIRATORY organs, *HOPF bifurcations

Abstract

The impact of air pollutants on the human respiratory system has received more and more attention. However, due to the differences in human characteristics and the strength of protective measures, different people have different symptoms in air pollution and viral infection environments. In this paper, an S I 1 I 2 P dynamic model of respiratory diseases infected by virus under air pollution is established by introducing air pollutant concentration compartment. Qualitative research shows that there are seven equilibria in the system, the daily average emission and clearance rate of pollutants are the key parameters affecting the existence and stability of equilibria. In this paper, by using Sotomayor's theorem and center manifold theory, it is proved that the system undergoes saddle–node bifurcation or Bogdanov–Takens bifurcation of co-dimension 3 at the boundary equilibrium, and exhibits saddle–node bifurcation at the endemic equilibrium. Numerical simulation results show that wearing masks in haze weather can not only reduce the number of allergic patients, but also reduce the number of viral patients. In addition, reducing the daily average emission of air pollution and increasing its clearance rate can also reduce the number of allergic patients. It is worth mentioning that this measure is more effective in controlling viral respiratory diseases. • The heterogeneity of patients is taken into consideration. • The average daily emission of air pollution, the clearance rate and the proportion of illness are the key parameters affecting the existence, local asymptotic stability and bifurcation. • Respiratory diseases can be controlled by reducing the daily average emission of air pollution and its clearance rate, and this measure has a better control effect on viral respiratory diseases. [ABSTRACT FROM AUTHOR]

Published

2024

17. Impact of Harvesting Intervention and Additional Food on Natural Enemy-Pest Dynamics in Agro-ecosystem

Author

Tripathi, Deepak and Singh, Anuraj

Published

2024

18. Bifurcation and dynamic analysis of prey–predator model with combined nonlinear harvesting.

Author

Sarkar, Kshirod and Mondal, Biswajit

Abstract

Due to the random search of species and from the economic point of view, combined harvesting is more suitable than selective harvesting. Thus, we have developed and analyzed a prey–predator model with the combined effect of nonlinear harvesting in this research paper. Nonlinear harvesting possesses multiple predator-free and interior equilibrium points in the dynamical system. We have examined the local stability analysis of all the equilibrium points. Besides these various types, rich and complex dynamical behaviors such as backward, saddle-node, Hopf and Bogdanov–Takens (BT) bifurcations, homo-clinic loop and limit cycles appear in this model. Furthermore, interesting phenomena like bi-stability and tri-stability occur in our model between the different equilibrium points. Also, we have derived different threshold values of predator harvesting parameters and prey environmental carrying capacity from these bifurcations to obtain the different harvesting strategies for both species. We have observed that the extinction of predator species may not happen due to backward bifurcation, although a stable predator-free equilibrium (PFE) exists. Finally, numerical simulations are discussed using MATLAB to verify all the theoretical results. [ABSTRACT FROM AUTHOR]

Published

2024

19. Bifurcation analysis of an SIS epidemic model with a generalized non-monotonic and saturated incidence rate.

Author

Huang, Chunxian, Jiang, Zhenkun, Huang, Xiaojun, and Zhou, Xiaoliang

Subjects

*BASIC reproduction number, *BIFURCATION theory, *HOPF bifurcations, *EPIDEMICS, *INFECTIOUS disease transmission, *PSYCHOLOGICAL factors, *DYNAMIC models

Abstract

In this paper, a new generalized non-monotonic and saturated incidence rate was introduced into a susceptible-infected-susceptible (SIS) epidemic model to account for inhibitory effect and crowding effect. The dynamic properties of the model were studied by qualitative theory and bifurcation theory. It is shown that when the influence of psychological factors is large, the model has only disease-free equilibrium point, and this disease-free equilibrium point is globally asymptotically stable; when the influence of psychological factors is small, for some parameter conditions, the model has a unique endemic equilibrium point, which is a cusp point of co-dimension two, and for other parameter conditions the model has two endemic equilibrium points, one of which could be weak focus or center. In addition, the results of the model undergoing saddle-node bifurcation, Hopf bifurcation and Bogdanov–Takens bifurcation as the parameters vary were also proved. These results shed light on the impact of psychological behavior of susceptible people on the disease transmission. [ABSTRACT FROM AUTHOR]

Published

2024

20. Period-1 to Period-4 Motions in a 5D Lorenz System.

Author

Guo, Siyu and Luo, Albert C. J.

Subjects

*PERIODIC motion, *ORBITS (Astronomy), *EIGENVALUES

Abstract

In this paper, a 5D Lorenz system is discussed. The discrete mappings are developed to solve the periodic motions in the 5D Lorenz system. Then the stability and bifurcations are determined by eigenvalue analysis. A bifurcation tree is presented to demonstrate that the discrete mapping method can provide not only stable orbits but also unstable motions. Finally, trajectory illustrations are given to show bifurcation influences on periodic orbits and homoclinic orbits in the 5D Lorenz system. [ABSTRACT FROM AUTHOR]

Published

2024

21. First Passage Times of Long Transient Dynamics in Ecology.

Author

Poulsen, Grant R., Plunkett, Claire E., and Reimer, Jody R.

Subjects

*TRANSIENTS (Dynamics), *ECOSYSTEM dynamics, *ECOLOGICAL models, *SYSTEM dynamics, *ENVIRONMENTAL management

Abstract

Long transient dynamics in ecological models are characterized by extended periods in one state or regime before an eventual, and often abrupt, transition. One mechanism leading to long transient dynamics is the presence of ghost attractors, states where system dynamics slow down and the system lingers before eventually transitioning to the true attractor. This transition results solely from system dynamics rather than external factors. This paper investigates the dynamics of a classical herbivore-grazer model with the potential for ghost attractors or alternative stable states. We propose an intuitive threshold for first passage time analysis applicable to both bistable and ghost attractor regimes. By formulating the first passage time problem as a backward Kolmogorov equation, we examine how the mean first passage time changes as parameters are varied from the ghost attractor regime to the bistable one, through a saddle-node bifurcation. Our results reveal that the mean and variance of first passage times vary smoothly across the bifurcation threshold, eliminating the deterministic distinction between ghost attractors and bistable regimes. This work suggests that first passage time analysis can be an informative way to classify the length of a long transient. A better understanding of the duration of long transients may contribute to greater ecological understanding and more effective environmental management. [ABSTRACT FROM AUTHOR]

Published

2024

22. Bistability of an HIV Model with Immune Impairment.

Author

Shaoli Wang, Tengfei Wang, Fei Xu, and Libin Rong

Subjects

*BASIC reproduction number, *HIV infections, *PATIENT experience, *HIV, *VIRAL replication

Abstract

The immune response is a crucial factor in controlling HIV infection. However, oxidative stress poses a significant challenge to the HIV-specific immune response, compromising the body's ability to control viral replication. In this paper, we develop an HIV infection model to investigate the impact of immune impairment on virus dynamics. We derive the basic reproduction number (R0) and threshold (Rc). Utilizing the antioxidant parameter as a bifurcation parameter, we establish that the system exhibits saddle-node bifurcation backward and forward bifurcations. Specifically, when R0 > Rc, the virus will rebound if the antioxidant parameter falls below the post-treatment control threshold. Conversely, when the antioxidant parameter exceeds the elite control threshold, the virus remains under elite control. The region between the two thresholds represents a bistable interval. These results can explain why some HIV-infected patients experience rapid viral rebound after treatment cessation while others achieve post-treatment control for a longer time. [ABSTRACT FROM AUTHOR]

Published

2024

23. Saddle-node bifurcation and Bogdanov-Takens bifurcation of a SIRS epidemic model with nonlinear incidence rate.

Author

Cui, Wenzhe and Zhao, Yulin

Subjects

*EPIDEMICS, *LIMIT cycles

Abstract

The Bogdanov-Takens bifurcation of the SIRS epidemic model with nonlinear incidence rate was studied by Ruan and Wang (2003) [11] , Tang et al. (2008) [13] and Lu et al. (2019) [9] in recent years. The results in the mentioned papers showed that the SIRS epidemic model with nonlinear incidence rate k I 2 / (1 + ω I 2) can undergo a Bogdanov-Takens bifurcation of codimension two. In this paper we study the SIRS epidemic model with nonlinear incidence rate k I p / (1 + ω I q) for general p and q. The bifurcation analysis indicates that there is a saddle-node or a cusp of codimension two for various parameter values and the model can undergo a saddle-node bifurcation or a Bogdanov-Takens bifurcation of codimension two if suitable bifurcation parameters are selected. It means that there are some SIRS epidemic models which have a limit cycle or a homoclinic loop. Moreover, it is also shown that the codimension of Bogdanov-Takens bifurcation is at most two. [ABSTRACT FROM AUTHOR]

Published

2024

24. A MODIFIED MAY–HOLLING–TANNER MODEL: THE ROLE OF DYNAMIC ALTERNATIVE RESOURCES ON SPECIES' SURVIVAL.

Author

SINGH, ANURAJ, TRIPATHI, DEEPAK, and KANG, YUN

Subjects

*PREDATION, *COEXISTENCE of species, *HOPF bifurcations, *DYNAMIC models, *NUMERICAL analysis, *MATHEMATICAL analysis

Abstract

This paper investigates the dynamical behavior of the modified May–Holling–Tanner model in the presence of dynamic alternative resources. We study the role of dynamic alternative resources on the survival of the species when there is prey rarity. Detailed mathematical analysis and numerical evaluations, including the situation of ecosystem collapsing, have been presented to discuss the coexistence of species', stability, occurrence of different bifurcations (saddle-node, transcritical, and Hopf) in three cases in the presence of prey and alternative resources, in the absence of prey and in the absence of alternative resources. It has been obtained that the multiple coexisting states and their stability are outcomes of variations in predation rate for alternative resources. Also, the occurrence of Hopf bifurcation, saddle-node bifurcation, and transcritical bifurcation are due to variations in the parameters of dynamic alternative resources. The impact of dynamic alternative resources on species' density reveals the fact that if the predation rate for alternative resources increases, then the prey biomass increases (under some restrictions), and variations in the predator's biomass widely depend upon the quality of food items. This study also points out that the survival of predators is possible in the absence of prey. In the theme of ecological balance, this study suggests some theoretical points of view for the eco-managers. [ABSTRACT FROM AUTHOR]

Published

2024

25. BIFURCATION ANALYSIS OF AN SIR MODEL WITH SATURATED INCIDENCE RATE AND STRONG ALLEE EFFECT.

Author

ZHANG, JIAJIA and QIAO, YUANHUA

Subjects

*ALLEE effect, *ORBITS (Astronomy), *HOPF bifurcations, *COMPUTER simulation

Abstract

In this paper, rich dynamics and complex bifurcations of an SIR epidemic model with saturated incidence rate and strong Allee effect are investigated. First, the existence of disease-free and endemic equilibria is explored, and we prove that the system has at most three positive equilibria, which exhibit different types such as hyperbolic saddle and node, degenerate unstable saddle (node) of codimension 2, degenerate saddle-node of codimension 3 at disease-free equilibria, and cusp, focus, and elliptic types Bogdanov–Takens singularities of codimension 3 at endemic equilibria. Second, bifurcation analysis at these equilibria are investigated, and it is found that the system undergoes a series of bifurcations, including transcritical, saddle node, Hopf, degenerate Hopf, homoclinic, cusp type Bogdanov–Takens of codimensional 2, and focus and elliptic type Bogdanov–Takens bifurcation of codimension 3 which are composed of some bifurcations with lower codimension. The system shows very rich dynamics such as the coexistence of multiple periodic orbits and homoclinic loops. Finally, numerical simulations are conducted on the theoretical results. [ABSTRACT FROM AUTHOR]

Published

2024

26. Carryover of a Saddle-Node Bifurcation After Transforming a Parameter into a Variable.

Author

Contreras, Carlos, Carrero, Gustavo, and de Vries, Gerda

Subjects

*BIFURCATION diagrams, *GENETIC regulation, *DYNAMICAL systems, *CELL cycle

Abstract

In this article, we introduce and study the carryover of a saddle-node bifurcation, a concept that describes how a saddle-node bifurcation of a dynamical system is carried over into an extended dynamical system obtained by transforming one of the parameters of the original system into a variable. We show that additional transversality and singularity conditions are needed to guarantee the carryover of a saddle-node bifurcation and provide a graphical methodology with a two-parameter bifurcation diagram to verify that such conditions are met. The results are applied to a gene activation model when the parameter describing the signal for activation is transformed into a variable, and to a cell cycle regulatory model when the parameter describing the cell mass is transformed into a variable. In both cases, we show that a saddle-node bifurcation carryover takes place. [ABSTRACT FROM AUTHOR]

Published

2024

27. Bifurcation analysis of a two–dimensional p53 gene regulatory network without and with time delay

Author

Xin Du, Quansheng Liu, and Yuanhong Bi

Subjects

stability, saddle–node bifurcation, hopf bifurcation, bogdanov–takens bifurcation, time delay, Mathematics, QA1-939, Applied mathematics. Quantitative methods, T57-57.97

Abstract

In this paper, the stability and bifurcation of a two–dimensional p53 gene regulatory network without and with time delay are taken into account by rigorous theoretical analyses and numerical simulations. In the absence of time delay, the existence and local stability of the positive equilibrium are considered through the Descartes' rule of signs, the determinant and trace of the Jacobian matrix, respectively. Then, the conditions for the occurrence of codimension–1 saddle–node and Hopf bifurcation are obtained with the help of Sotomayor's theorem and the Hopf bifurcation theorem, respectively, and the stability of the limit cycle induced by hopf bifurcation is analyzed through the calculation of the first Lyapunov number. Furthermore, codimension-2 Bogdanov–Takens bifurcation is investigated by calculating a universal unfolding near the cusp. In the presence of time delay, we prove that time delay can destabilize a stable equilibrium. All theoretical analyses are supported by numerical simulations. These results will expand our understanding of the complex dynamics of p53 and provide several potential biological applications.

Published

2024

28. Impacts of planktonic components on the dynamics of cholera epidemic: Implications from a mathematical model.

Author

Medda, Rakesh, Tiwari, Pankaj Kumar, and Pal, Samares

Abstract

The aim of this paper is to investigate the role of plankton populations in the aquatic reservoir on the transmission dynamics of acute cholera within the human communities. To this, we develop a nonlinear six dimensional mathematical model that combines the plankton populations with the epidemiological SIR-type human subpopulations and the V. cholerae bacterial population in the aquatic reservoir. It is assumed that the susceptible humans become infected either by ingesting zooplankton, which serves as a reservoir for the cholera pathogen, by free-living V. cholerae in the water, or by cholera-infected individuals. We explore the existence and stability of all biologically plausible equilibria of the system. Also, we determine basic reproduction number (R 0) and introduced an additional threshold, named planktonic factor (E 0), that is found to significantly affect the cholera transmission. Furthermore, cholera-free equilibrium encounters transcritical bifurcation at R 0 = 1 within the planktonic factor's unitary range. We perform some sensitivity tests to determine how the epidemic thresholds R 0 and E 0 will respond to change in the parametric values. The existence of saddle–node bifurcation is shown numerically. Our findings reveal that there are strong connections between the planktonic blooms and the cholera epidemic. We observe that even while eliminating cholera from the human population is very difficult, we may nevertheless lessen the epidemic condition by enhancing immunization, treatment and other preventive measures. [ABSTRACT FROM AUTHOR]

Published

2024

29. Normal Forms, Holomorphic Linearization and Generic Bifurcations of Dynamic Equations on Discrete Time Scales.

Author

Medveď, Milan

Subjects

*NONLINEAR equations, *DIFFERENTIAL equations, *DYNAMIC stability, *EQUATIONS, *DYNAMICAL systems, *BIFURCATION diagrams, *CONTINUOUS time models

Abstract

In this paper, we extend the classical theory of normal forms for continuous and difference dynamical systems to dynamic equations on discrete time scales. As consequences of the well known results from the theory of analytic differential equations, we obtain some versions of the Poincaré and Siegel theorems for dynamic equations on discrete time scales. Using these results and known results on the stability of dynamic equations on time scales, we obtain some stability results for the nonlinear dynamic equations. We also prove some results on generic properties of bifurcation curves and the saddle-node bifurcation for one-parameter families of dynamic equations on arbitrary time scales. [ABSTRACT FROM AUTHOR]

Published

2024

30. A finding of the maximal saddle-node bifurcation for systems of differential equations.

Author

Il'yasov, Yavdat

Subjects

*DIFFERENTIAL equations, *RAYLEIGH quotient, *NONLINEAR equations, *POINT set theory, *POSITIVE systems

Abstract

A variational method is presented for directly finding the bifurcation point of nonlinear equations as the saddle-node point of the extended nonlinear Rayleigh quotient. In the main result, this method is justified for finding the maximum saddle-node bifurcation point of the set of stable positive solutions to a system of equations with nonlinearities of convex-concave type. [ABSTRACT FROM AUTHOR]

Published

2024

31. Modeling the Bifurcation Dynamics of Rumor Propagation in the Spatial Environment.

Author

Zhu, Linhe and Chen, Xinlin

Subjects

*RUMOR, *HOPF bifurcations, *PSYCHOLOGICAL factors, *NONSMOOTH optimization

Abstract

The harm caused by rumors is immeasurable. Studying the dynamic characteristics of rumors can help control their spread. In this paper, we propose a nonsmooth rumor model with a nonlinear propagation rate. First, we utilize the positive invariant regions to prove the boundedness of solutions. Second, we analyze the conditions for the existence of equilibrium points in both the left and right systems. Additionally, we confirm the occurrence of saddle-node bifurcation in the left system. Next, by considering the influence of spatial diffusion, we establish the conditions for Turing instability. Then we discuss the conditions for spatial homogeneous and inhomogeneous Hopf bifurcations in the left and right systems, respectively. We differentiate between supercritical and subcritical bifurcations using the Lyapunov coefficient. Furthermore, we examine the conditions for the existence of discontinuous Hopf bifurcation at the demarcation point. Finally, in the numerical simulation section, we validate our theorems on Turing patterns. We also investigate the impact of parameter changes on rumor propagation and conclude that an increase in the psychological inhibitory factor significantly reduces the rate of rumor propagation, providing an effective strategy for curbing rumors. To that end, we fit actual data to our system and the results are excellent, confirming the validity of the system. [ABSTRACT FROM AUTHOR]

Published

2024

32. Bifurcation analysis of a two–dimensional p53 gene regulatory network without and with time delay.

Author

Du, Xin, Liu, Quansheng, and Bi, Yuanhong

Subjects

*GENE regulatory networks, *HOPF bifurcations, *COMPUTER simulation, *TIME delay systems, *BIFURCATION theory

Abstract

In this paper, the stability and bifurcation of a two–dimensional p53 gene regulatory network without and with time delay are taken into account by rigorous theoretical analyses and numerical simulations. In the absence of time delay, the existence and local stability of the positive equilibrium are considered through the Descartes' rule of signs, the determinant and trace of the Jacobian matrix, respectively. Then, the conditions for the occurrence of codimension–1 saddle–node and Hopf bifurcation are obtained with the help of Sotomayor's theorem and the Hopf bifurcation theorem, respectively, and the stability of the limit cycle induced by hopf bifurcation is analyzed through the calculation of the first Lyapunov number. Furthermore, codimension-2 Bogdanov–Takens bifurcation is investigated by calculating a universal unfolding near the cusp. In the presence of time delay, we prove that time delay can destabilize a stable equilibrium. All theoretical analyses are supported by numerical simulations. These results will expand our understanding of the complex dynamics of p53 and provide several potential biological applications. [ABSTRACT FROM AUTHOR]

Published

2024

33. Study of co-dimension two bifurcation of a prey–predator model with prey refuge and non-linear harvesting on both species.

Author

Majumdar, Prahlad, Ghosh, Uttam, Sarkar, Susmita, and Debnath, Surajit

Abstract

The dynamics of prey–predator system, when one or both the species are harvested non-linearly, has become a topic of intense study because of its wide applications in biological control and species conservation. In this paper we have discuss different bifurcation analysis of a two dimensional prey–predator model with Beddington–DeAngelis type functional response in the presence of prey refuge and non-linear harvesting of both species. We have studied the positivity and boundedness of the model system. All the biologically feasible equilibrium points are investigated and their local stability is analyzed in terms of model parameters. The global stability of coexistence equilibrium point has been discussed. Depending on the prey harvesting effort ( E 1 ) and degree of competition among the boats, fishermen and other technology ( l 1 ) used for prey harvesting, the number of axial and interior equilibrium points may change. The system experiences different type of co-dimension one bifurcations such as transcritical, Hopf, saddle-node bifurcation and co-dimension two Bogdanov–Takens bifurcation. The parameter values at the Bogdanov–Takens bifurcation point are highly sensitive in the sense that the nature of coexistence equilibrium point changes dramatically in the neighbourhood of this point. The feasible region of the bifurcation diagram in the l 1 - E 1 parametric plane divides into nine distinct sub-regions depending on the number and nature of equilibrium points. We carried out some numerical simulations using the Maple and MATLAB software to justify our theoretical findings and finally some conclusions are given. [ABSTRACT FROM AUTHOR]

Published

2023

34. Stability and bifurcation analysis of a two-patch model with the Allee effect and dispersal

Author

Yue Xia, Lijuan Chen, Vaibhava Srivastava, and Rana D. Parshad

Subjects

nonlinear dispersal, allee effect, stability, saddle-node bifurcation, patch model, reaction-diffusion system, Biotechnology, TP248.13-248.65, Mathematics, QA1-939

Abstract

In the current manuscript, a two-patch model with the Allee effect and nonlinear dispersal is presented. We study both the ordinary differential equation (ODE) case and the partial differential equation (PDE) case here. In the ODE model, the stability of the equilibrium points and the existence of saddle-node bifurcation are discussed. The phase diagram and bifurcation curve of our model are also given as a results of numerical simulation. Besides, the corresponding linear dispersal case is also presented. We show that, when the Allee effect is large, high intensity of linear dispersal is not favorable to the persistence of the species. We further show when the Allee effect is large, nonlinear diffusion is more beneficial to the survival of the population than linear diffusion. Moreover, the results of the PDE model extend our findings from discrete patches to continuous patches.

Published

2023

35. Relaxation oscillations of a piecewise-smooth slow-fast Bazykin's model with Holling type Ⅰ functional response

Author

Xiao Wu, Shuying Lu, and Feng Xie

Subjects

predator-prey model, piecewise-smooth holling type ⅰ functional response, relaxation oscillation cycle, saddle-node bifurcation, boundary equilibrium bifurcation, Biotechnology, TP248.13-248.65, Mathematics, QA1-939

Abstract

In this paper, we consider the dynamics of a slow-fast Bazykin's model with piecewise-smooth Holling type Ⅰ functional response. We show that the model has Saddle-node bifurcation and Boundary equilibrium bifurcation. Furthermore, it is also proven that the model has a homoclinic cycle, a heteroclinic cycle or two relaxation oscillation cycles for different parameters conditions. These results imply the dynamical behavior of the model is sensitive to the predator competition rate and the initial densities of prey and predators. In order to support the theoretical analysis, we present some phase portraits corresponding to different values of parameters by numerical simulation. These phase portraits include two relaxation oscillation cycles, an unstable relaxation oscillation cycle surrounded by a stable homoclinic cycle; the coexistence of a heteroclinic cycle and an unstable relaxation oscillation cycle. These results reveal far richer and much more complex dynamics compared to the model without different time scale or with smooth Holling type Ⅰ functional response.

Published

2023

36. Predicting saddle-node bifurcations using transient dynamics: a model-free approach.

Author

Habib, Giuseppe

Abstract

This paper proposes a novel method for predicting the presence of saddle-node bifurcations in dynamical systems. The method exploits the effect that saddle-node bifurcations have on transient dynamics in the surrounding phase space and parameter space, and does not require any information about the steady-state solutions associated with the bifurcation. Specifically, trajectories of a system obtained for parameters close to the saddle-node bifurcation present local minima of the logarithmic decrement trend in the vicinity of the bifurcation. By tracking the logarithmic decrement for these trajectories, the saddle-node bifurcation can be accurately predicted. The method does not strictly require any mathematical model of the system, but only a few time series, making it directly implementable for gray- and black-box models and experimental apparatus. The proposed algorithm is tested on various systems of different natures, including a single-degree-of-freedom system with nonlinear damping, the mass-on-moving-belt, a time-delayed inverted pendulum, and a pitch-and-plunge wing profile. Benefits, limitations, and future perspectives of the method are also discussed. The proposed method has potential applications in various fields, such as engineering, physics, and biology, where the identification of saddle-node bifurcations is crucial for understanding and controlling complex systems. [ABSTRACT FROM AUTHOR]

Published

2023

37. Stability and bifurcation analysis of a two-patch model with the Allee effect and dispersal.

Author

Xia, Yue, Chen, Lijuan, Srivastava, Vaibhava, and Parshad, Rana D.

Subjects

*STABILITY theory, *BIFURCATION theory, *ALLEE effect, *DISPERSAL (Ecology), *ORDINARY differential equations

Abstract

In the current manuscript, a two-patch model with the Allee effect and nonlinear dispersal is presented. We study both the ordinary differential equation (ODE) case and the partial differential equation (PDE) case here. In the ODE model, the stability of the equilibrium points and the existence of saddle-node bifurcation are discussed. The phase diagram and bifurcation curve of our model are also given as a results of numerical simulation. Besides, the corresponding linear dispersal case is also presented. We show that, when the Allee effect is large, high intensity of linear dispersal is not favorable to the persistence of the species. We further show when the Allee effect is large, nonlinear diffusion is more beneficial to the survival of the population than linear diffusion. Moreover, the results of the PDE model extend our findings from discrete patches to continuous patches. [ABSTRACT FROM AUTHOR]

Published

2023

38. Bifurcation of a disappearance of a non-compact heteroclinic curve.

Author

Pochinka, Olga V., Shmukler, Valeriya I., and Talanova, Elena A.

Subjects

*SOLAR corona, *TOPOLOGY

Abstract

In the present paper, we describe a scenario of a disappearance of a non-compact heteroclinic curve for a three-dimensional diffeomorphism. As a consequence, it is established that 3-diffeomorphisms with a unique heteroclinic curve and fixed points of pairwise different Morse indices exist only on the 3-sphere. The described scenario is directly related to the reconnection processes in the solar corona, the mathematical essence of which, from the point of view of the magnetic charging topology, consists of a disappearance or a birth of non-compact heteroclinic curves. [ABSTRACT FROM AUTHOR]

Published

2023

39. BIFURCATION ANALYSIS OF AN ALLELOPATHIC PHYTOPLANKTON MODEL.

Author

CHEN, SHANGMING, CHEN, FENGDE, LI, ZHONG, and CHEN, LIJUAN

Subjects

*PHYTOPLANKTON, *POSITIVE systems, *COMPUTER simulation

Abstract

This paper analyzes an allelopathic phytoplankton competition model, which was proposed by Bandyopadhyay [Dynamical analysis of a allelopathic phytoplankton model, J Biol Syst14(02):205–217, 2006]. Our study refines the previous results and finds at most three positive equilibria for the system. The existence conditions of all positive equilibria and the corresponding stability cases are given in the paper. Interesting dynamical phenomena such as bistability, saddle-node bifurcation, and cusp bifurcation are found. It is shown that the rate of toxin releases heavily influences the positive equilibria of the system under certain conditions. Numerical simulations verify the feasibility of the theoretical results. [ABSTRACT FROM AUTHOR]

Published

2023

40. On the (1+4)-body problem with J2 potential.

Author

Gauthier, Ryan and Stoica, Cristina

Subjects

*EQUILIBRIUM

Abstract

We consider the (1 + 4) -body problem with a Newtonian potential augmented by a " J 2 " inverse-cubic perturbation. We describe the square-shaped homographic motions, and we find a saddle-centre bifurcation of the rotating equilibria (RE). Further, we prove that for a sufficiently small perturbation, all square-shaped RE are unstable. [ABSTRACT FROM AUTHOR]

Published

2023

41. Impact of Volatile Mediated Indirect Defense Response of Plant and Herbivore Refuge in Tritrophic Cascade

Author

Mondal, Ritwika, Kesh, Dipak, Mukherjee, Debasis, and Saha, Suman

Published

2024

42. On the dynamics of the singularly perturbed of the difference equation with continuous arguments corresponding to the Hénon map

Author

A.M.A. El-Sayed, S.M. Salman, and A.M.A. Abo-Bakr

Subjects

Hénon map, Singular perturbation, stability, Hopf bifurcation, Saddle-node bifurcation, Chaos, Engineering (General). Civil engineering (General), TA1-2040

Abstract

The Hénon map was introduced by Hénon. It is a very rich dynamical model as Hénon himself proved and compared the dynamical properties of his map with those of other dynamical systems such as the Ro¨ssler model. Here, we study the dynamics of the difference equation with continuous arguments corresponding to the Hénon map and its singularly perturbed counterpart. The local stability of fixed points is studied. The system exhibits various types of bifurcation, such as saddle-node and Hopf bifurcations. By letting the perturbation parameter ∊⟶0, we show that the singularly perturbed equation exhibits the same qualitative behavior as its corresponding difference equation. The singularly perturbed equation exhibits the same qualitative behavior as its corresponding delay differential equation when ∊⟶1. The method of steps is used to discretize the original system to simulate the behavior of the original system. Numerical simulations are performed to confirm the theoretical analysis obtained and to illustrate the complex dynamics of the system. Moreover, the numerical simulations illustrate the effect of the perturbation parameter. In particular, the occurrence of halving-period bifurcation due to small change in the perturbation parameter.

Published

2023

43. Bifurcation Analysis in a Coffee Berry-Borer-and-Ants Prey–Predator Model

Author

Carlos Andrés Trujillo-Salazar, Gerard Olivar-Tost, and Deissy Milena Sotelo-Castelblanco

Subjects

coffee berry borer, prey–predator model, nonhyperbolic equilibrium point, transcritical bifurcation, saddle-node bifurcation, Mathematics, QA1-939

Abstract

One of the most important agricultural activities worldwide, coffee cultivation, is severely affected by the Coffee Berry Borer (CBB), Hypothenemus hampei, considered the primary coffee pest. The CBB is a tiny beetle that diminishes the quantity and quality of coffee beans by penetrating them to feed on the endosperm and deposit its eggs, continuing its life cycle. One strategy to combat CBBs is using biological control agents, such as certain species of ants. Here, a mathematical model (consisting of a system of nonlinear ordinary differential equations) is formulated to describe the prey–predator interaction between CBBs and an unspecified species of ants. From this mathematical perspective, the model allows us to determine conditions for the existence and stability of extinction, persistence or co-existence equilibria. Transitions among those equilibrium states are investigated through the maximum per capita consumption rate of the predator as a bifurcation parameter, allowing us to determine the existence of transcritical and saddle-node bifurcations. Phase portraits of the system are presented for different values of bifurcation parameter, to illustrate stability outcomes and the occurrence of bifurcations. It is concluded that an increase in bifurcation parameters significantly reduces the CBB population, suggesting that ant predation is an effective control strategy, at least theoretically.

Published

2024

44. Bifurcation of an SIRS Model with a Modified Nonlinear Incidence Rate.

Author

Zhang, Yingying and Li, Chentong

Subjects

*BASIC reproduction number, *HOPF bifurcations, *EPIDEMICS

Abstract

An SIRS epidemic model with a modified nonlinear incidence rate is studied, which describes that the infectivity is strong at first as the emergence of a new disease or the reemergence of an old disease, but then the psychological effect will weaken the infectivity. Lastly, the infectivity goes to a saturation state as a result of a crowding effect. The nonlinearity of the functional form of the incidence of infection is modified, which is more reasonable biologically. We analyze the stability of the associated equilibria, and the basic reproduction number and the critical value which determine the dynamics of the model are derived. The bifurcation analysis is presented, including backward bifurcation, saddle-node bifurcation, Bogdanov–Takens bifurcation of codimension two and Hopf bifurcation. To study Hopf bifurcation of codimension three of the model when some assumptions hold, the focus values are calculated. Numerical simulations are shown to verify our results. [ABSTRACT FROM AUTHOR]

Published

2023

45. Jump and Pull-in Instability of a MEMS Gyroscope Vibrating System.

Author

Zhu, Yijun and Shang, Huilin

Subjects

GYROSCOPES, THRESHOLD voltage, STRUCTURAL reliability, DYNAMICAL systems, VOLTAGE, RESONANCE

Abstract

Jump and pull-in instability are common nonlinear dynamic behaviors leading to the loss of the performance reliability and structural safety of electrostatic micro gyroscopes. To achieve a better understanding of these initial-sensitive phenomena, the dynamics of a micro gyroscope system considering the nonlinearities of the stiffness and electrostatic forces are explored from a global perspective. Static and dynamic analyses of the system are performed to estimate the threshold of the detecting voltage for static pull-in, and dynamic responses are analyzed in the driving and detecting modes for the case of primary resonance and 1:1 internal resonance. The results show that, when the driving voltage frequency is a bit higher than the natural frequency, a high amplitude of the driving AC voltage may induce the coexistence of bistable periodic responses due to saddle-node bifurcation of the periodic solution. Basins of attraction of bistable attractors provide evidence that disturbance of the initial conditions can trigger a jump between bistable attractors. Moreover, the Melnikov method is applied to discuss the condition for pull-in instability, which can be ascribed to heteroclinic bifurcation. The validity of the prediction is verified using the sequences of safe basins and unsafe zones for dynamic pull-in. It follows that pull-in instability can be caused and aggravated by the increase in the amplitude of the driving AC voltage. [ABSTRACT FROM AUTHOR]

Published

2023

46. Stochastic analysis and optimal control of a donation game system with non-uniform interaction rates and Gram–Schmidt orthogonalization procedure.

Author

Yuan, Hairui, Meng, Xinzhu, Alzahrani, Abdullah Khames, and Zhang, Tonghua

Subjects

STOCHASTIC control theory, ORTHOGONALIZATION, DEFECTORS

Abstract

This paper investigates an evolutionary donation game with non-uniform interaction rates in well-mixed populations. Further, we consider that the costs and benefits of the game are subject to stochastic disturbances and explore the stochastic replicator dynamics. Firstly, the system has two interior equilibrium points, one of which is stable. In other words, cooperators and defectors coexist when the interaction rates satisfy certain conditions. And the number of cooperators may exceed the number of defectors, which changes the final steady state of the traditional donation game system. Secondly, according to It o ^ ′ s formula and Gram-Schmidt orthogonalization procedure, we obtain the stochastic replicator equation of the game. Since the different interaction rates between players lead to the emergence of the interior equilibria of the system, we give the conditions for the stochastic stability of equilibria. The relationship between interaction rate and disturbance value is shown, and we explore the optimal path from the area of stochastic stability to the area of stochastic instability. In short, the donation game system has two stable states, and we can control the cooperators in the population by the non-uniform interaction rates. Finally, we conduct numerical simulations and find that it is consistent with the theoretical results described previously. [ABSTRACT FROM AUTHOR]

Published

2023

47. Dynamical Study and Optimal Harvesting of a Two-species Amensalism Model Incorporating Nonlinear Harvesting.

Author

Singh, Manoj Kumar and Poonam

Subjects

*HARVESTING, *PHASE diagrams, *ECOLOGICAL models, *NUMERICAL analysis, *HOPF bifurcations, *NONLINEAR dynamical systems

Abstract

This study proposes a two-species amensalism model with a cover to protect the first species from the second species, with the assumption that the growth of the second species is governed by nonlinear harvesting. Analytical and numerical analyses have both been done on this suggested ecological model. Boundedness and positivity of the solutions of the model are examined. The existence of feasible equilibrium points and their local stability have been discussed. In addition, the parametric conditions under which the proposed system is globally stable have been determined. It has also been shown, using the Sotomayor theorem, that under certain parametric conditions, the suggested model exhibits a saddle-node bifurcation. The parametric conditions for the existence of the bionomic equilibrium point have been obtained. The optimal harvesting strategy has been investigated utilising the Pontryagins Maximum Principle. The potential phase portrait diagrams have been provided to corroborate the acquired findings. [ABSTRACT FROM AUTHOR]

Published

2023

48. Bifurcation Analysis of a COVID-19 Dynamical Model in the Presence of Holling Type-II Saturated Treatment with Reinfection

Author

Devi, Arpita and Gupta, Praveen Kumar

Published

2024

49. Complex dynamics of a Leslie–Gower predator–prey model with Allee effect and variable prey refuge

Author

Chen, Miqin and Yang, Wensheng

Published

2023

50. Analytical Periodic Motions for a First-Order Nonlinear Circuit System Under Different Excitations

Author

Liu, Yan, Ma, Kai, He, Hao, Xiao, Jun, Luo, Albert C. J., Series Editor, and Zhang, Jiazhong, editor

Published

2022