Showing total 1,201 results

1. Dynamical analysis of a heroin–cocaine epidemic model with nonlinear incidence and spatial heterogeneity.

Author

Xu, Jinhu

Subjects

HEROIN, BASIC reproduction number, GLOBAL asymptotic stability, HETEROGENEITY, EPIDEMICS, DOPAMINE

Abstract

In this paper, we investigated a new heroin–cocaine epidemic model which incorporates spatial heterogeneity and nonlinear incidence rate. The main project of this paper is to explore the threshold dynamics in terms of the basic reproduction number $ \mathcal {R}_0 $ R 0 , which was defined by applying the next-generation operator. The threshold type results shown that if $ \mathcal {R}_0 \lt 1 $ R 0 < 1 , then the drug-free steady state is globally asymptotically stable. If $ \mathcal {R}_0 \gt 1 $ R 0 > 1 , then heroin–cocaine spread is uniformly persistent. Furthermore, the globally asymptotic stability of the drug-free steady state has been established for the critical case of $ \mathcal {R}_0=1 $ R 0 = 1 by analysing the local asymptotic stability and global attractivity. [ABSTRACT FROM AUTHOR]

Published

2023

2. Dynamics of a stochasticmodified Leslie--Gower predator--prey system with hunting cooperation.

Author

Chao Li and Peilin Shi

Subjects

EIGENFUNCTIONS, LYAPUNOV functions, COMPUTER simulation, PREDATORY animals, HUNTING

Abstract

In this paper, we consider a stochastic two-species predator--prey system with modified Leslie--Gower. Meanwhile, we assume that hunting cooperation occurs in the predators. By using Itô formula and constructing a proper Lyapunov function, we first show that there is a unique global positive solution for any given positive initial value. Furthermore, based on Chebyshev inequality, the stochastic ultimate boundedness and stochastic permanence are discussed. Then, under some conditions, we prove the persistence in mean and extinction of system. Finally, we verify our results by numerical simulations. [ABSTRACT FROM AUTHOR]

Published

2024

3. The role of long-lived plasma cells in viral clearance.

Author

Mingran Zhang, Meili Li, and Junling Ma

Subjects

BASIC reproduction number, IMMUNOLOGIC memory, PLASMA cells, IMMUNE system, T cells

Abstract

The adaptive immune system has two types of plasma cells (PC), long-lived plasma cells (LLPC) and short-lived plasma cells (SLPC), that differ in their lifespan. In this paper, we propose that LLPC is crucial to the clearance of viral particles in addition to reducing the viral basic reproduction number in secondary infections. We use a sequence of within-host mathematical models to show that, CD8 T cells, SLPC and memory B cells cannot achieve full viral clearance, and the viral load will reach a low positive equilibrium level because of a continuous replenishment of target cells. However, the presence of LLPC is crucial for viral clearance. [ABSTRACT FROM AUTHOR]

Published

2024

4. Optimal control strategies on HIV/AIDS and pneumonia co-infection with mathematical modelling approach.

Author

Teklu, Shewafera Wondimagegnhu, Terefe, Birhanu Baye, Mamo, Dejen Ketema, and Abebaw, Yohannes Fissha

Subjects

ORDINARY differential equations, AIDS, MIXED infections, HIV, VACCINATION

Abstract

In this paper, a compartmental model on the co-infection of pneumonia and HIV/AIDS with optimal control strategies was formulated using the system of ordinary differential equations. Using qualitative methods, we have analysed the mono-infection and HIV/AIDS and pneumonia co-infection models. We have computed effective reproduction numbers by applying the next-generation matrix method, applying Castillo Chavez criteria the models disease-free equilibrium points global stabilities were shown, while we have used the Centre manifold criteria to determine that the pneumonia infection and pneumonia and HIV/AIDS co-infection exhibit the phenomenon of backward bifurcation whenever the corresponding effective reproduction number is less than unity. We carried out the numerical simulations to investigate the behaviour of the co-infection model solutions. Furthermore,wehave investigated various optimal control strategies to predict the best control strategy to minimize and possibly to eradicate the HIV/AIDS and pneumonia co-infection from the community. [ABSTRACT FROM AUTHOR]

Published

2024

5. Global dynamics of discretemathematical models of tuberculosis.

Author

Elaydi, Saber and Lozi, René

Subjects

DISEASE eradication, PREVENTIVE medicine, TUBERCULOSIS, PUBLIC health, EQUILIBRIUM

Abstract

In this paper, we develop discrete models of Tuberculosis (TB). This includes SEI endogenous and exogenous models without treatment. These models are then extended to a SEIT model with treatment. We develop two types of net reproduction numbers, one is the traditional R0 which is based on the disease-free equilibrium, and a new net reproduction number R0 (E*) based on the endemic equilibrium. It is shown that the disease-free equilibrium is globally asymptotically stable if R0 ≤ 1 and unstable if R0 > 1. Moreover, the endemic equilibrium is locally asymptotically stable if R0(E*) < 1 < R0. [ABSTRACT FROM AUTHOR]

Published

2024

6. Estimation of spreading speeds and travelling waves for the lattice pioneer-climax competition system.

Author

Haifeng Song and Yuxiang Zhang

Subjects

LATTICE dynamics, DYNAMICAL systems, LINEAR systems, NATIVE species, INTRODUCED species

Abstract

This paper concerns the invasion dynamics of the lattice pioneerclimax competition model with parameter regions in which the system is non-monotone. We estimate the spreading speeds and establish appropriate conditions under which the spreading speeds are linearly selected. Moreover, the existence of travelling waves is determined by constructing suitable upper and lower solutions. It shows that the spreading speed coincides with the minimum wave speed of travelling waves if the diffusion rate of the invasive species is larger or equal to that of the native species. Our results are new to estimate the spreading speed of non-monotone lattice pioneer-climax systems, and the techniques developed in this work can be used to study the invasion dynamics of the pioneer-climax system with interaction delays, which could extend the results in the literature. The analysis replies on the construction of auxiliary systems, upper and lower solutions, and the monotone dynamical system approach. [ABSTRACT FROM AUTHOR]

Published

2024

7. Modelling and analysis of periodic impulsive releases of the Nilaparvata lugens infected with wStri-Wolbachia.

Author

Dai, Xiangjun, Quan, Qi, and Jiao, Jianjun

Subjects

NILAPARVATA lugens, NUMERICAL analysis

Abstract

In this paper, we formulate a population suppression model and a population replacement model with periodic impulsive releases of Nilaparvata lugens infected with wStri. The conditions for the stability of wild- $ N.\,lugens $ N. l u g e n s -eradication periodic solution of two systems are obtained by applying the Floquet theorem and comparison theorem. And the sufficient conditions for the persistence in the mean of wild $ N.\,lugens $ N. l u g e n s are also given. In addition, the sufficient conditions for the extinction and persistence of the wild $ N.\,lugens $ N. l u g e n s in the subsystem without wLug are also obtained. Finally, we give numerical analysis which shows that increasing the release amount or decreasing the release period are beneficial for controlling the wild $ N.\,lugens $ N. l u g e n s , and the efficiency of population replacement strategy in controlling wild populations is higher than that of population suppression strategy under the same release conditions. [ABSTRACT FROM AUTHOR]

Published

2023

8. Treatment of leishmaniasis with chemotherapy and vaccine: a mathematical model.

Author

Siewe, Nourridine and Friedman, Avner

Subjects

LEISHMANIASIS, VISCERAL leishmaniasis, MATHEMATICAL models, CANCER chemotherapy, COMMUNICABLE diseases, DRUG resistance, CUTANEOUS leishmaniasis

Abstract

Leishmaniasis, an infectious disease, manifests itself mostly in two forms, cutaneous leishmaniasis (CL) and, a more severe and potentially deadly form, visceral leishmaniasis (VL). The current control strategy for leishmaniasis relies on chemotherapy drugs such as sodium antimony gluconate (SAG) and meglumine antimoniate (MA). However, all these chemotherapy compounds have poor efficacy, and they are associated with toxicity and other adverse effects, as well as drug resistance. While research in vaccine development for leishmaniasis is continuously progressing, no vaccine is currently available. However, some experimental vaccines such as LEISH-F1+MPL-SE (V) have demonstrated some efficacy when used as drugs for CL patients. In this paper we use a mathematical model to address the following question: To what extent vaccine shots can enhance the efficacy of standard chemotherapy treatment of leishmaniasis? Starting with standard MA treatment of leishmaniasis and combining it with three injections of V , we find, by Day 84, that efficacy increased from 29% to 65–91% depending on the amount of the vaccine. With two or just one injection of V , efficacy is still very high, but there is a definite resurgence of the disease by end-time. [ABSTRACT FROM AUTHOR]

Published

2023

9. A simple reaction–diffusion system as a possible model for the origin of chemotaxis.

Author

Gong, Yishu and Kiselev, Alexander

Subjects

CHEMOTAXIS, CELL motility, CELL polarity, REACTION-diffusion equations, CELL cycle proteins, COMPUTER simulation, CHEMOKINE receptors

Abstract

Chemotaxis is a directed cell movement in response to external chemical stimuli. In this paper, we propose a simple model for the origin of chemotaxis – namely how a directed movement in response to an external chemical signal may occur based on purely reaction–diffusion equations reflecting inner working of the cells. The model is inspired by the well-studied role of the rho-GTPase Cdc42 regulator of cell polarity, in particular in yeast cells. We analyse several versions of the model to better understand its analytic properties and prove global regularity in one and two dimensions. Using computer simulations, we demonstrate that in the framework of this model, at least in certain parameter regimes, the speed of the directed movement appears to be proportional to the size of the gradient of signalling chemical. This coincides with the form of the chemical drift in the most studied mean field model of chemotaxis, the Keller–Segel equation. [ABSTRACT FROM AUTHOR]

Published

2023

10. Stability switches and chaos induced by delay in a reaction-diffusion nutrient-plankton model.

Author

Guo, Qing, Wang, Lijun, Liu, He, Wang, Yi, Li, Jianbing, Kumar Tiwari, Pankaj, Zhao, Min, and Dai, Chuanjun

Subjects

HOPF bifurcations, AQUATIC habitats, NUTRIENT uptake

Abstract

In this paper, we investigate a reaction-diffusion model incorporating dynamic variables for nutrient, phytoplankton, and zooplankton. Moreover, we account for the impact of time delay in the growth of phytoplankton following nutrient uptake. Our theoretical analysis reveals that the time delay can trigger the emergence of persistent oscillations in the model via a Hopf bifurcation. We also analytically track the direction of Hopf bifurcation and the stability of the bifurcating periodic solutions. Our simulation results demonstrate stability switches occurring for the positive equilibrium with an increasing time lag. Furthermore, the model exhibits homogeneous periodic-2 and 3 solutions, as well as chaotic behaviour. These findings highlight that the presence of time delay in the phytoplankton growth can bring forth dynamical complexity to the nutrient-plankton system of aquatic habitats. [ABSTRACT FROM AUTHOR]

Published

2023

11. Steady solution and its stability of a mathematical model of diabetic atherosclerosis.

Author

Xie, Xuming

Subjects

FOAM cells, MATHEMATICAL models, PEOPLE with diabetes, MYOCARDIAL infarction, ATHEROSCLEROSIS, PARTIAL differential equations, FUZZY neural networks, LOW density lipoprotein receptors

Abstract

Atherosclerosis is a leading cause of death worldwide. Making matters worse, nearly 463 million people have diabetes, which increases atherosclerosis-related inflammation. Diabetic patients are twice as likely to have a heart attack or stroke. In this paper, we consider a simplified mathematical model for diabetic atherosclerosis involving LDL, HDL, glucose, insulin, free radicals (ROS), β cells, macrophages and foam cells, which satisfy a system of partial differential equations with a free boundary, the interface between the blood flow and the plaque. We establish the existence of small radially symmetric stationary solutions to the model and study their stability. Our analysis shows that the plague will persist due to hyperglycemia even when LDL and HDL are in normal range, hence confirms that diabetes increase the risk of atherosclerosis. [ABSTRACT FROM AUTHOR]

Published

2023

12. Optimal control and cost-effectiveness analysis for leptospirosis epidemic.

Author

Engida, Habtamu Ayalew, Theuri, David Mwangi, Gathungu, Duncan Kioi, and Gachohi, John

Subjects

PONTRYAGIN'S minimum principle, LEPTOSPIROSIS, OPTIMAL control theory, COST effectiveness, EPIDEMICS, RODENTICIDES

Abstract

This paper aims to apply an optimal control theory for the autonomous model of the leptospirosis epidemic to examine the effect of four time-dependent control measures on the model dynamics with cost-effectiveness. Pontryagin's Maximum Principle was used to derive the optimality system associated with the optimal control problem. Numerical simulations of the optimality system were performed for different control strategies and the results were presented graphically with and without controls. The optimality system was simulated using the Forward–Backward Sweep method in the Matlab programme. The numerical results revealed that the combination of all optimal control measures is the most effective strategy for minimizing the spread and impact of disease in the community. Furthermore, a cost-effectiveness analysis was performed to determine the most cost-effective strategy using the incremental cost-effectiveness ratio approach and we observed that the rodenticide control-only strategy is most effective to combat the spread of disease when available resources are limited. [ABSTRACT FROM AUTHOR]

Published

2023

13. Adaptive delayed reproduction in a 2-dimensional discrete-time competition model.

Author

Kon, Ryusuke

Subjects

REPRODUCTION, SPECIES

Abstract

This paper studies a 2-dimensional discrete-time competition model of Ricker type with reproductive delay. The model is examined under the assumption that species 1 and 2 have the same properties except that a fraction η of species 1 individuals delays the initiation of reproduction. This assumption ensures that species 1 is dominated by species 2 in the sense that species 2 is increasing whenever species 1 is increasing. It is shown that, even under this assumption, delayed reproduction can be adaptive, i.e. species 1 can invade the monoculture system of species 2 while species 2 cannot invade the monoculture system of species 1, if the population is fluctuating. The result is obtained by analytically examining the species invasibility at boundary 2-cycles, whose coordinates can be estimated by assuming $ \eta \approx 0 $ η ≈ 0. [ABSTRACT FROM AUTHOR]

Published

2023

14. Unequal effects of SARS-CoV-2 infections: model of SARS-CoV-2 dynamics in Cameroon (Sub-Saharan Africa) versus New York State (United States).

Author

Siewe, Nourridine and Yakubu, Abdul-Aziz

Subjects

COVID-19 pandemic, SARS-CoV-2, COVID-19, VIRUS diseases, DEVELOPING countries

Abstract

Worldwide, the recent SARS-CoV-2 virus disease outbreak has infected more than 691,000,000 people and killed more than 6,900,000. Surprisingly, Sub-Saharan Africa has suffered the least from the SARS-CoV-2 pandemic. Factors that are inherent to developing countries and that contrast with their counterparts in developed countries have been associated with these disease burden differences. In this paper, we developed data-driven COVID-19 mathematical models of two 'extreme': Cameroon, a developing country, and New York State (NYS) located in a developed country. We then identified critical parameters that could be used to explain the lower-than-expected COVID-19 disease burden in Cameroon versus NYS and to help mitigate future major disease outbreaks. Through the introduction of a 'disease burden' function, we found that COVID-19 could have been much more severe in Cameroon than in NYS if the vaccination rate had remained very low in Cameroon and the pandemic had not ended. [ABSTRACT FROM AUTHOR]

Published

2023

15. A discrete-time nutrients-phytoplankton-oysters mathematical model of a bay ecosystem.

Author

Ziyadi, Najat

Subjects

PHYTOPLANKTON, OYSTER populations, ENVIRONMENTAL impact analysis, PHYTOPLANKTON populations, ALGAL blooms, MATHEMATICAL models

Abstract

Populations are generally censused daily, weekly, monthly or annually. In this paper, we introduce a discrete-time nutrients-phytoplankton-oysters (NPO) model that describes the interactions of nutrients, phytoplankton and oysters in a bay ecosystem. We compute the threshold parameter $ \mathcal {R}_N $ R N for persistence of phytoplankton with or without oysters. When $ \mathcal {R}_{N} \lt 1 $ R N < 1 , then both phytoplankton and oysters populations go extinct. However, when $ \mathcal {R}_N \gt 1 $ R N > 1 , we show that the model may exhibit two scenarios: (1) a locally asymptotically stable equilibrium with positive values of nutrients and phytoplankton with oysters missing, and (2) a locally asymptotically stable interior equilibrium with positive values of nutrients, phytoplankton and oysters. We use sensitivity analysis to study the impact of human and environmental factors on the model. We use examples to illustrate that some human activities and environmental factors can force the interior equilibrium to undergo a Neimark–Sacker bifurcation which generates phytoplankton blooms with oscillations in oysters population and nutrients level. [ABSTRACT FROM AUTHOR]

Published

2023

16. Dynamical behaviour of an intraguild predator–prey model with prey refuge and hunting cooperation.

Author

Meng, Xin-You and Feng, Yan

Subjects

LOTKA-Volterra equations, HOPF bifurcations, ORDINARY differential equations, PARTIAL differential equations, TOPOLOGICAL degree, HUNTING, COOPERATION

Abstract

An intraguild predator–prey model including prey refuge and hunting cooperation is investigated in this paper. First, for the corresponding ordinary differential equation model, the existence and stability of all equilibria are given, and the existence of Hopf bifurcation, direction and stability of bifurcating periodic solutions are investigated. Then, for partial differential equation model, the diffusion-driven Turing instability is obtained. What is more, the existence and non-existence of the non-constant positive steady state of the reaction–diffusion model are established by the Leray–Schauder degree theory and some priori estimates. Next, some numerical simulations are performed to support analytical results. The results showed that prey refuge can change the stability of model and even have a stabilizing effect on this model, meanwhile the hunting cooperation can make such model without diffusion unstable, but make such model with diffusion stable. Lastly, a brief conclusion is concluded in the last section. [ABSTRACT FROM AUTHOR]

Published

2023

17. A refined asymptotic result of one-dimensional flux limited Keller–Segel models.

Author

Xu, Xin

Subjects

CELL aggregation

Abstract

In this paper, we consider a flux-limited Keller–Segel model derived in [16, 18] in a one-dimensional bounded domain and give a refined asymptotic result of the spiky steady state by using the Sturm oscillation theorem in a more meticulous way based on the existence result of spiky steady state in [4], showing a more accurate characterization of the cell aggregation phenomenon. [ABSTRACT FROM AUTHOR]

Published

2023

18. Optimal control and cost-effectiveness analysis of age-structured malaria model with asymptomatic carrier and temperature variability.

Author

Kalula, Asha, Mureithi, Eunice, Marijani, Theresia, and Mbalawata, Isambi

Subjects

PONTRYAGIN'S minimum principle, INSECTICIDES, MALARIA, COST effectiveness, MALARIA prevention

Abstract

This paper presents an age-structured mathematical model for malaria transmission dynamics with asymptomatic carrier and temperature variability. The temperature variability function is fitted to the temperature data, and the malaria model is then fitted to the malaria cases and validated to check its suitability. Time-dependent controls were considered, including Long Lasting Insecticide Nets, treatment of symptomatic, screening and treatment of asymptomatic carriers and spray of insecticides. Pontryagin's Maximum Principle is used to derive the necessary conditions for optimal control of the disease. The numerical simulations of the optimal control problem reveal that the strategy involving the combination of all four controls is the most effective in reducing the number of infected individuals. Furthermore, the cost-effectiveness analysis shows that treatment of symptomatic, screening and treatment of asymptomatic carriers and insecticide spraying is the most cost-effective strategy to implement to control malaria transmission when available resources are limited. [ABSTRACT FROM AUTHOR]

Published

2023

19. A stochastic predator–prey model with two competitive preys and Ornstein–Uhlenbeck process.

Author

Liu, Qun

Subjects

ORNSTEIN-Uhlenbeck process, STOCHASTIC models, STOCHASTIC systems, DENSITY matrices, POPULATION dynamics

Abstract

In this paper, a stochastic predator–prey model with two competitive preys and Ornstein–Uhlenbeck process is formulated and analysed, which is used to obtain a better understanding of the population dynamics. At first, we validate that the stochastic system has a unique global solution with any initial value. Then we analyse the stochastic dynamics of the model in detail, including pth moment boundedness, asymptotic pathwise estimation in turn. After that, we obtain sufficient conditions for the existence of a stationary distribution of the system by adopting stochastic Lyapunov function methods. In addition, under some mild conditions, we derive the specific form of covariance matrix in the probability density near the quasi-positive equilibrium of the stochastic system. Finally, numerical illustrative examples are depicted to confirm our theoretical findings. [ABSTRACT FROM AUTHOR]

Published

2023

20. Modeling virus transport and dynamics in viscous flow medium.

Author

Tripathi, Dharmendra, Bhandari, Dinesh, Kumar, Rakesh, and Aboelkassem, Yasser

Subjects

DRAG force, BLOOD flow, VIRAL transmission, STOKES flow, BLOOD vessels, LAGRANGE equations

Abstract

In this paper, we developed a mathematical model to simulate virus transport through a viscous background flow driven by the natural pumping mechanism. Two types of respiratory pathogens viruses (SARS-Cov-2 and Influenza-A) are considered in this model. The Eulerian–Lagrangian approach is adopted to examine the virus spread in axial and transverse directions. The Basset–Boussinesq–Oseen equation is considered to study the effects of gravity, virtual mass, Basset force, and drag forces on the viruses transport velocity. The results indicate that forces acting on the spherical and non-spherical particles during the motion play a significant role in the transmission process of the viruses. It is observed that high viscosity is responsible for slowing the virus transport dynamics. Small sizes of viruses are found to be highly dangerous and propagate rapidly through the blood vessels. Furthermore, the present mathematical model can help to better understand the viruses spread dynamics in a blood flow. [ABSTRACT FROM AUTHOR]

Published

2023

21. Predation-induced dispersal toward fitness for predator invasion in predator–prey models.

Author

Choi, Wonhyung, Kim, Kwangjoong, and Ahn, Inkyung

Subjects

PREDATORY animals, DEATH rate, ALARMS

Abstract

In this paper, we consider a predator–prey model with nonuniform predator dispersal, called predation-induced dispersal (PID), which represents predator motility depending on the maximal predation rate and the predator death rate in a spatially heterogeneous region. We study the local stability of the semitrivial steady state when predators are absent for models with PID and linear dispersal. We then investigate the local/global bifurcation from the semitrivial steady state of these models. Finally, we compare the results of the model with PID to the results of the model with linear dispersal. We conclude that the nonuniform dispersal of predators obeying PID increases fitness for predator invasion when rare; thus, predators with PID can invade a region with an increased probability even in cases wherein predators dispersed linearly cannot invade a certain region. Based on the results, we provide an ecological interpretation with the simulations. [ABSTRACT FROM AUTHOR]

Published

2023

22. A dynamical analysis and numerical simulation of COVID-19 and HIV/AIDS co-infection with intervention strategies.

Author

Teklu, Shewafera Wondimagegnhu and Kotola, Belela Samuel

Subjects

HIV infection transmission, HIV infections, MIXED infections, NUMERICAL analysis, BASIC reproduction number, COMPUTER simulation, AIDS

Abstract

HIV/AIDS-COVID-19 co-infection is a major public health concern especially in developing countries of the world. This paper presents HIV/AIDS-COVID-19 co-infection to investigate the impact of interventions on its transmission using ordinary differential equation. In the analysis of the model, the solutions are shown to be non-negative and bounded, using next-generation matrix approach the basic reproduction numbers are computed, sufficient conditions for stabilities of equilibrium points are established. The sensitivity analysis showed that transmission rates are the most sensitive parameters that have direct impact on the basic reproduction numbers and protection and treatment rates are more sensitive and have indirect impact to the basic reproduction numbers. Numerical simulations shown that some parameter effects on the transmission of single infections as well as co-infection, and applying the protection rates and treatment rates have effective roles to minimize and also to eradicate the HIV/AIDS-COVID-19 co-infection spreading in the community. [ABSTRACT FROM AUTHOR]

Published

2023

23. Stationary distribution and global stability of stochastic predator-prey model with disease in prey population.

Author

Gokila, C., Sambath, M., Balachandran, K., and Ma, Yong-Ki

Subjects

STOCHASTIC models, BIOTIC communities, PREDATION, BIOLOGICAL models, LYAPUNOV functions, COMPUTER simulation

Abstract

In this paper, a new stochastic four-species predator-prey model with disease in the first prey is proposed and studied. First, we present the stochastic model with some biological assumptions and establish the existence of globally positive solutions. Moreover, a condition for species to be permanent and extinction is provided. The above properties can help to save the dangered population in the ecosystem. Through Lyapunov functions, we discuss the asymptotic stability of a positive equilibrium solution for our model. Furthermore, it is also shown that the system has a stationary distribution and indicating the existence of a stable biotic community. Finally, our results of the proposed model have revealed the effect of random fluctuations on the four species ecosystem when adding the alternative food sources for the predator population. To illustrate our theoretical findings, some numerical simulations are presented. [ABSTRACT FROM AUTHOR]

Published

2023

24. INTRODUCTION.

Author

Gumel, Abba B. and Henson, Shandelle

Subjects

ARCHIVES, POPULATION biology, POPULATION ecology, INFECTIOUS disease transmission, MYCOBACTERIUM tuberculosis, PREDATION, MINORS

Abstract

This document is an introduction to a special issue of the Journal of Biological Dynamics dedicated to the memory of Abdul-Aziz Yakubu, a mathematician known for his contributions to population biology. The papers in this issue cover a range of topics in mathematical biology, including discrete-time and continuous-time models used to study real-life phenomena in population biology and ecology. The articles were reviewed by independent reviewers and cover subjects such as nutrient-phytoplankton-oysters systems, host-parasitoid systems, predator-prey systems, disease spread, and the modeling of various diseases. The guest editors express their gratitude to the authors and reviewers for their contributions. [Extracted from the article]

Published

2024

25. A discrete-time risk-structured model of cholera infections in Cameroon.

Author

Che, Eric and Yakubu, Abdul-Aziz

Subjects

CHOLERA, ORDINARY differential equations

Abstract

In a recent paper, Che et al. [5] used a continuous-time Ordinary Differential Equation (ODE) model with risk structure to study cholera infections in Cameroon. However, the population and the reported cholera cases in Cameroon are censored at discrete-time annual intervals. In this paper, unlike in [5], we introduce a discrete-time risk-structured cholera model with no spatial structure. We use our discrete-time demographic equation to 'fit' the annual population of Cameroon. Furthermore, we use our fitted discrete-time model to capture the annually reported cholera cases from 1987 to 2004 and to study the impact of vaccination, treatment and improved sanitation on the number of cholera infections from 2004 to 2019. Our discrete-time cholera model confirms the results of the ODE model in [5]. However, our discrete-time model predicts a decrease in the number of cholera cases in a shorter period of cholera intervention (2004–2019) as compared to the ODE model's period of intervention (2004–2022). [ABSTRACT FROM AUTHOR]

Published

2021

26. Honoring the life and legacy of Fred Brauer.

Author

Kribs, Christopher M. and van den Driessche, Pauline

Subjects

POPULATION biology, RESEARCH personnel, MENTORING, EPIDEMIOLOGY, DEDICATIONS

Abstract

The work of Fred Brauer (1932–2021) broke new ground in several areas of mathematical population biology, especially mathematical epidemiology and population management. This special issue reflects his legacy: the lines of inquiry he opened, the impact of his research and his books, and his mentoring of generations of young researchers. This dedication highlights milestones in his career and connects his work to the contributions in this issue. [ABSTRACT FROM AUTHOR]

Published

2023

27. On the dynamics of one-prey-n-predator impulsive reaction-diffusion predator-prey system with ratio-dependent functional response.

Author

Liu, Zijian, Zhang, Lei, Li, Bing, Fang, Chengling, Bi, Ping, and Pang, Jianhua

Subjects

IMPULSE (Psychology), PREDATION, DIFFERENTIAL equations, REACTION-diffusion equations, STABILITY constants

Abstract

In this paper, a one-prey-n-predator impulsive reaction-diffusion periodic predator-prey system with ratio-dependent functional response is investigated. On the basis of the upper and lower solution method and comparison theory of differential equation, sufficient conditions on the ultimate boundedness and permanence of the predator-prey system are established. By constructing an appropriate auxiliary function, the conditions for the existence of a unique globally stable positive periodic solution are also obtained. Examples and numerical simulations are presented to verify the feasibility of our results. A discussion is conducted at the end. [ABSTRACT FROM AUTHOR]

Published

2018

28. Selfish altruism, fierce cooperation and the predator*.

Author

Askitas, Nikolaos

Subjects

GAME theory in biology, ALTRUISM, NASH equilibrium, PREDATOR management, COOPERATION

Abstract

This paper suggests a new way to think about a famous question: what explains cooperation in nature and in particular in humans? I argue that, for an evolutionary biologist as well as a quantitative social scientist, the triangle of two 'teammates' in the presence of a predator (passing and shooting in two-on-one situations) is one of the fundamental conceptual building-blocks for understanding these phenomena because in such a situation the fact that life is packaged in many distinct enclosures (and not in one big monolithic blob) can unfold its comparative advantage. I show how, in the presence of a predator, cooperative equilibria emerge among entirely selfish teammates if we infinitesimally bias the lead player in the selfish direction or assign a computational burden on the predator due to the presence of a teammate. I argue that 'predators' are common in the biological jungle but also in everyday human settings. Intuitively, this paper builds on the simple idea - a familiar one to a biologist observing the natural world but perhaps less so to social scientists - that everybody has enemies. [ABSTRACT FROM AUTHOR]

Published

2018

29. Dynamics of a glucose–insulin model.

Author

Ma, Mingju and Li, Jun

Subjects

NON-communicable diseases, INSULIN therapy, PEOPLE with diabetes, WORLD health, DIABETES, HYPERGLYCEMIA, BOTULINUM toxin

Abstract

Diabetes mellitus is a noncommunicable disease, which is a serious threat to human health around the world. In this paper, we propose a simple glucose–insulin model with Michaelis–Menten function as insulin degradation rate to mimic the pathogenic mechanism of diabetes. By theoretical analysis, a unique positive equilibrium of model exists and it is globally asymptotically stable. The four strategies are designed for diabetes patients based on the sensitivity of parameters, including insulin injection and medicine treatments. Numerical simulations are given to support the theoretical results. [ABSTRACT FROM AUTHOR]

Published

2022

30. Dynamical analysis of a modified Leslie–Gower Holling-type II predator-prey stochastic model in polluted environments with interspecific competition and impulsive toxicant input.

Author

Gao, Yongxin and Yao, Shuyuan

Subjects

POISONS, STOCHASTIC models, ORNSTEIN-Uhlenbeck process, STOCHASTIC processes, COMPUTER simulation, COMPETITION (Biology), PREDATION

Abstract

In this paper, we use a mean-reverting Ornstein-Uhlenbeck process to simulate the stochastic perturbations in the environment, and then a modified Leslie–Gower Holling-type II predator-prey stochastic model in a polluted environment with interspecific competition and pulse toxicant input is proposed. Through constructing V-function and applying It o ^ ′ s formula, the sharp sufficient conditions including strongly persistent in the mean, persistent in the mean and extinction are established. In addition, the theoretical results are verified by numerical simulation. [ABSTRACT FROM AUTHOR]

Published

2022

31. Dynamics of a multi-strain malaria model with diffusion in a periodic environment.

Author

Shi, Yangyang, Zhao, Hongyong, and Zhang, Xuebing

Subjects

MALARIA, INFECTIOUS disease transmission, INSECTICIDE resistance, COMPUTER simulation, MOSQUITO control

Abstract

This paper mainly explores the complex impacts of spatial heterogeneity, vector-bias effect, multiple strains, temperature-dependent extrinsic incubation period (EIP) and seasonality on malaria transmission. We propose a multi-strain malaria transmission model with diffusion and periodic delays and define the reproduction numbers R i and R ^ i (i = 1, 2). Quantitative analysis indicates that the disease-free ω-periodic solution is globally attractive when R i < 1 , while if R i > 1 > R j ( i ≠ j , i , j = 1 , 2), then strain i persists and strain j dies out. More interestingly, when R 1 and R 2 are greater than 1, the competitive exclusion of the two strains also occurs. Additionally, in a heterogeneous environment, the coexistence conditions of the two strains are R ^ 1 > 1 and R ^ 2 > 1. Numerical simulations verify the analytical results and reveal that ignoring vector-bias effect or seasonality when studying malaria transmission will underestimate the risk of disease transmission. [ABSTRACT FROM AUTHOR]

Published

2022

32. Dynamic analysis of stochastic delay mutualistic system of leaf-cutter ants with stage structure and their fungus garden.

Author

Zhang, Ruimin, Liu, Xiaohui, and Wei, Chunjin

Subjects

LEAF-cutting ants, GARDEN structures, ANTS, WHITE noise, DYNAMICAL systems, STOCHASTIC models, STOCHASTIC analysis

Abstract

In this paper, we propose a stochastic delay mutualistic model of leaf-cutter ants with stage structure and their fungus garden, in which we explore how the discrete delay and white noise affect the dynamic of the population system. The existence and uniqueness of global positive solution are proved, and the asymptotic behaviours of the stochastic model around the positive equilibrium point of the deterministic model are also investigated. Furthermore, the sufficient conditions for the persistence of the population are established. Finally, some numerical simulations are performed to show the effect of random environmental fluctuation on the model. [ABSTRACT FROM AUTHOR]

Published

2022

33. Deciphering the transmission dynamics of COVID-19 in India: optimal control and cost effective analysis.

Author

Bajiya, Vijay Pal, Bugalia, Sarita, Tripathi, Jai Prakash, and Martcheva, Maia

Subjects

INFECTIOUS disease transmission, COST control, COST analysis, BASIC reproduction number, COVID-19

Abstract

In this paper we assess the effectiveness of different non-pharmaceutical interventions (NPIs) against COVID-19 utilizing a compartmental model. The local asymptotic stability of equilibria (disease-free and endemic) in terms of the basic reproduction number have been determined. We find that the system undergoes a backward bifurcation in the case of imperfect quarantine. The parameters of the model have been estimated from the total confirmed cases of COVID-19 in India. Sensitivity analysis of the basic reproduction number has been performed. The findings also suggest that effectiveness of face masks plays a significant role in reducing the COVID-19 prevalence in India. Optimal control problem with several control strategies has been investigated. We find that the intervention strategies including implementation of lockdown, social distancing, and awareness only, has the highest cost-effectiveness in controlling the infection. This combined strategy also has the least value of average cost-effectiveness ratio (ACER) and associated cost. [ABSTRACT FROM AUTHOR]

Published

2022

34. Analysis of HIV latent infection model with multiple infection stages and different drug classes.

Author

Alshorman, Areej, Al-hosainat, Nidal, and Jackson, Trachette

Subjects

LATENT infection, HIV infections, HIGHLY active antiretroviral therapy, HIV, HIV infection transmission, T cells

Abstract

Latently infected CD 4 + T cells represent one of the major obstacles to HIV eradication even after receiving prolonged highly active anti-retroviral therapy (HAART). Long-term use of HAART causes the emergence of drug-resistant virus which is then involved in HIV transmission. In this paper, we develop mathematical HIV models with staged disease progression by incorporating entry inhibitor and latently infected cells. We find that entry inhibitor has the same effect as protease inhibitor on the model dynamics and therefore would benefit HIV patients who developed resistance to many of current anti-HIV medications. Numerical simulations illustrate the theoretical results and show that the virus and latently infected cells reach an infected steady state in the absence of treatment and are eliminated under treatment whereas the model including homeostatic proliferation of latently infected cells maintains the virus at low level during suppressive treatment. Therefore, complete cure of HIV needs complete eradication of latent reservoirs. [ABSTRACT FROM AUTHOR]

Published

2022

35. Dynamics analysis of stage-structured wild and sterile mosquito interaction impulsive model.

Author

Pang, Yiyou, Wang, Shuai, and Liu, Siyu

Subjects

FLOQUET theory, MOSQUITO control, LYAPUNOV stability, STABILITY theory, MOSQUITOES, COMPUTER simulation

Abstract

In this paper, we study a stage-structured wild and sterile mosquito interaction impulsive model. The aim is to study the feasibility of controlling the population of wild mosquitoes by releasing sterile mosquitoes periodically. The existence of trivial periodic solutions is obtained, and the corresponding local stability and global stability conditions are proved by Floquet theory and Lyapunov stability theorem, respectively. And we prove the existence conditions of non-trivial periodic solutions and their local stability. We can find that the system has the bistable phenomenon in which the trivial periodic solution and the non-trivial periodic solution can coexist under certain threshold conditions. All the results show that the appropriate release period and release amount of sterile mosquitoes can control the wild mosquito population within a certain range and even make them extinct. Finally, numerical simulation verifies our theoretical results. [ABSTRACT FROM AUTHOR]

Published

2022

36. Mathematical analysis of the transmission dynamics of COVID-19 infection in the presence of intervention strategies.

Author

Teklu, Shewafera Wondimagegnhu

Subjects

COVID-19, INFECTIOUS disease transmission, MATHEMATICAL analysis, PUBLIC health, GLOBAL analysis (Mathematics), SARS-CoV-2

Abstract

The novel Coronavirus (COVID-19) infection has become a global public health issue, and it has been a cause for morbidity and mortality of more people throughout the world. In this paper, we investigated the impacts of vaccination, other protection measures, home quarantine with treatment, and hospital quarantine with treatment strategies simultaneously using a deterministic mathematical modelling approach. No one has considered these intervention strategies simultaneously in his/her modelling approach. We examined all the qualitative properties of the model such as the positivity and boundedness of the model solutions, the disease-free and endemic equilibrium points, the effective reproduction number using next-generation matrix method, local stabilities of equilibrium points using the Routh–Hurwitz method. Using the Centre Manifold criteria, we have shown the existence of backward bifurcation whenever the COVID-19 effective reproduction number is less than unity. Moreover, we have analysed both sensitivity and numerical simulation using parameter values taken from published literature. The numerical results show that the transmission rate is the most sensitive parameter we have to control. Also vaccination, other protection measures, home quarantine with treatment, and hospital quarantine with treatment have great effects to minimize the COVID-19 transmission in the community. [ABSTRACT FROM AUTHOR]

Published

2022

37. Recurrent epidemic waves in a delayed epidemic model with quarantine.

Author

Kuniya, Toshikazu

Subjects

BASIC reproduction number, EPIDEMICS, HOPF bifurcations, QUARANTINE

Abstract

In this paper, we are concerned with an epidemic model with quarantine and distributed time delay. We define the basic reproduction number R 0 and show that if R 0 ≤ 1 , then the disease-free equilibrium is globally asymptotically stable, whereas if R 0 > 1 , then it is unstable and there exists a unique endemic equilibrium. We obtain sufficient conditions for a Hopf bifurcation that induces a nontrivial periodic solution which represents recurrent epidemic waves. By numerical simulations, we illustrate stability and instability parameter regions. Our results suggest that the quarantine and time delay play important roles in the occurrence of recurrent epidemic waves. [ABSTRACT FROM AUTHOR]

Published

2022

38. Analysing transmission dynamics of HIV/AIDS with optimal control strategy and its controlled state.

Author

Wattanasirikosone, Rinlapas and Modnak, Chairat

Subjects

HIV infection transmission, HIV, AIDS, INFECTIOUS disease transmission, OPTIMAL control theory, AIDS treatment

Abstract

HIV is a virus that weakens a person's immune system. HIV has three stages, and AIDS is the most severe stage of HIV (Stage 3). People with HIV should take medicine (called ART) recommended by WHO as soon as possible to reduce the amount of virus in the body. In this paper, we formulate a mathematical model for HIV/AIDS with a new approach by focusing on two groups of infectious individuals, HIV and AIDS. We also introduce a controlled class (treated patients and being monitored), and people in this class can spread the disease. We further investigate the essential dynamics of the model through an equilibrium analysis. Optimal control theory is applied to explore effective treatment strategies by combining two control measures: standard antiretroviral therapy and AIDS treatments. Numerical simulation results show the effects of the two time-dependent controls, and they can be used as guidelines for public health interventions. [ABSTRACT FROM AUTHOR]

Published

2022

39. Stability of a fear effect predator–prey model with mutual interference or group defense.

Author

He, Mengxin and Li, Zhong

Subjects

HOPF bifurcations, LIMIT cycles, PREDATION, LOTKA-Volterra equations, ORBITS (Astronomy)

Abstract

In this paper, we consider a fear effect predator–prey model with mutual interference or group defense. For the model with mutual interference, we show the interior equilibrium is globally stable, and the mutual interference can stabilize the predator–prey system. For the model with group defense, we discuss the singular dynamics around the origin and the occurrence of Hopf bifurcation, and find that there is a separatrix curve near the origin such that the orbits above which tend to the origin and the orbits below which tend to limit cycle or the interior equilibrium. [ABSTRACT FROM AUTHOR]

Published

2022

40. Viability of Pentadesma in reduced habitat ecosystems within two climatic regions with fruit harvesting.

Author

Leite, Maria C. A., Chen-Charpentier, Benito, Agusto, Folashade B., Gaoue, Orou G., and Hritonenko, Natali

Subjects

FRUIT harvesting, NON-timber forest products, LOGGING, HARVESTING, HABITATS, ECOSYSTEMS, FRUIT yield

Abstract

Habitat loss and harvesting of non-timber forest products (NTFPs) significantly affect the population dynamics. In this paper, we propose a general mathematical modelling approach incorporating the impact of habitat size reduction and non-lethal harvesting of NTFP on population dynamics. The model framework integrates experimental data of Pentadesma butyracea in Benin. This framework allows us to determine the rational non-lethal harvesting level and habitat size to ensure the stability of the plant ecosystem, and to study the impacts of distinct levels of humidity. We suggest non-lethal harvesting policies that maximize the economic benefit for local populations. [ABSTRACT FROM AUTHOR]

Published

2022

41. Impact of information and Lévy noise on stochastic COVID-19 epidemic model under real statistical data.

Author

Liu, Peijiang, Huang, Lifang, Din, Anwarud, and Huang, Xiangxiang

Subjects

COVID-19 pandemic, STATISTICS, COMPUTER simulation, COVID-19, EPIDEMICS

Abstract

In this paper, we consider the dynamical behaviour of a stochastic coronavirus (COVID-19) susceptible-infected-removed epidemic model with the inclusion of the influence of information intervention and Lévy noise. The existence and uniqueness of the model positive solution are proved. Then, we establish a stochastic threshold as a sufficient condition for the extinction and persistence in mean of the disease. Based on the available COVID-19 data, the parameters of the model were estimated and we fit the model with real statistics. Finally, numerical simulations are presented to support our theoretical results. [ABSTRACT FROM AUTHOR]

Published

2022

42. Uniqueness and stability of periodic solutions for an interactive wild and Wolbachia-infected male mosquito model.

Author

Yan, Rong and Sun, Qiwen

Subjects

MALE models, MOSQUITOES, GLOBAL asymptotic stability, BIRTH rate

Abstract

We investigate a mosquito population suppression model, which includes the release of Wolbachia-infected males causing incomplete cytoplasmic incompatibility (CI). The model consists of two sub-equations by considering the density-dependent birth rate of wild mosquitoes. By assuming the release waiting period T is larger than the sexual lifespan T ¯ of Wolbachia-infected males, we derive four thresholds: the CI intensity threshold s h ∗ , the release amount thresholds g ∗ and c ∗ , and the waiting period threshold T ∗ . From a biological view, we assume s h > s h ∗ throughout the paper. When g ∗ < c < c ∗ , we prove the origin E 0 is locally asymptotically stable iff T < T ∗ , and the model admits a unique T-periodic solution iff T ≥ T ∗ , which is globally asymptotically stable. When c ≥ c ∗ , we show the origin E 0 is globally asymptotically stable iff T ≤ T ∗ , and the model has a unique T-periodic solution iff T > T ∗ , which is globally asymptotically stable. Our theoretical results are confirmed by numerical simulations. [ABSTRACT FROM AUTHOR]

Published

2022

43. A mathematical model for tilapia lake virus transmission with waning immunity.

Author

Kenne, Cyrille, Zongo, Pascal, and Dorville, René

Subjects

TILAPIA, MATHEMATICAL models, IMMUNITY, HOPF bifurcations, LAKES

Abstract

The goal of this paper is to investigate the influence of the waning immunity on the dynamics of Tilapia Lake Virus (TiLV) transmission in wild and farmed tilapia within freshwater. We formulate a model for which susceptible individuals can contract the disease in two ways: (i) direct mode caused by contact with infected individuals; (ii) indirect mode due to the presence of pathogenic agents in the water. We obtain an age-structured model which combines both age since infection and age since recovery. We derive an explicit formula for the reproductive number R 0 and show that the disease-free equilibrium is locally asymptotically stable when, R 0 < 1. We discuss on the form of the waning immunity parameter and show numerically that a Hopf bifurcation may occur for suitable immunity parameter values, which means that there is a periodic solution around the endemic equilibrium when, R 0 > 1. [ABSTRACT FROM AUTHOR]

Published

2022

44. Persistence and extinction of a modified Leslie–Gower Holling-type II two-predator one-prey model with Lévy jumps.

Author

Gao, Yongxin and Yang, Fan

Subjects

JUMP processes, ORNSTEIN-Uhlenbeck process, PREDATION, POSITIVE systems, BIOLOGICAL extinction, COMPUTER simulation

Abstract

This paper is concerned with a modified Leslie–Gower and Holling-type II two-predator one-prey model with Lévy jumps. First, we use an Ornstein–Uhlenbeck process to describe the environmental stochasticity and prove that there is a unique positive solution to the system. Moreover, sufficient conditions for persistence in the mean and extinction of each species are established. Finally, we give some numerical simulations to support the main results. [ABSTRACT FROM AUTHOR]

Published

2022

45. Dynamics and control strategy for a delayed viral infection model.

Author

Zhang, Suxia, Li, Fei, and Xu, Xiaxia

Subjects

VIRUS diseases, CYTOTOXIC T cells, HOPF bifurcations, HEPATITIS B, VIRAL load, PLANT viruses

Abstract

In this paper, we derive a delayed epidemic model to describe the characterization of cytotoxic T lymphocyte (CTL)-mediated immune response against virus infection. The stability of equilibria and the existence of Hopf bifurcation are analysed. Theoretical results reveal that if the basic reproductive number is greater than 1, the positive equilibrium may lose its stability and the bifurcated periodic solution occurs when time delay is taken as the bifurcation parameter. Furthermore, we investigate an optimal control problem according to the delayed model based on the available therapy for hepatitis B infection. With the aim of minimizing the infected cells and viral load with consideration for the treatment costs, the optimal solution is discussed analytically. For the case when periodic solution occurs, numerical simulations are performed to suggest the optimal therapeutic strategy and compare the model-predicted consequences. [ABSTRACT FROM AUTHOR]

Published

2022

46. Dynamic analysis and optimal control of a class of SISP respiratory diseases.

Author

Shi, Lei and Qi, Longxing

Subjects

RESPIRATORY diseases, DUST removal, CONCENTRATION functions, SENSITIVITY analysis, FACTOR analysis, GLOBAL analysis (Mathematics)

Abstract

In this paper, the actual background of the susceptible population being directly patients after inhaling a certain amount of PM 2.5 is taken into account. The concentration response function of PM 2.5 is introduced, and the SISP respiratory disease model is proposed. Qualitative theoretical analysis proves that the existence, local stability and global stability of the equilibria are all related to the daily emission P 0 of PM 2.5 and PM 2.5 pathogenic threshold K. Based on the sensitivity factor analysis and time-varying sensitivity analysis of parameters on the number of patients, it is found that the conversion rate β and the inhalation rate η has the largest positive correlation. The cure rate γ of infected persons has the greatest negative correlation on the number of patients. The control strategy formulated by the analysis results of optimal control theory is as follows: The first step is to improve the clearance rate of PM 2.5 by reducing the PM 2.5 emissions and increasing the intensity of dust removal. Moreover, such removal work must be maintained for a long time. The second step is to improve the cure rate of patients by being treated in time. After that, people should be reminded to wear masks and go out less so as to reduce the conversion rate of susceptible people becoming patients. [ABSTRACT FROM AUTHOR]

Published

2022

47. Existence and stability of two periodic solutions for an interactive wild and sterile mosquitoes model.

Author

Zhu, Zhongcai, Yan, Rong, and Feng, Xiaomei

Subjects

MOSQUITOES, PROBABILITY theory

Abstract

In this paper, we study the periodic and stable dynamics of an interactive wild and sterile mosquito population model with density-dependent survival probability. We find a release amount upper bound G ∗ , depending on the release waiting period T, such that the model has exactly two periodic solutions, with one stable and another unstable, provided that the release amount does not exceed G ∗ . A numerical example is also given to illustrate our results. [ABSTRACT FROM AUTHOR]

Published

2022

48. Using an age-structured COVID-19 epidemic model and data to model virulence evolution in Wuhan, China.

Author

Duan, Xi-Chao, Li, Xue-Zhi, Martcheva, Maia, and Yuan, Sanling

Subjects

COVID-19 pandemic, COVID-19, DATA modeling, VIRUS diseases, INFECTIOUS disease transmission, PLANT viruses

Abstract

COVID-19 is a disease caused by infection with the virus 2019-nCoV, a single-stranded RNA virus. During the infection and transmission processes, the virus evolves and mutates rapidly, though the disease has been quickly controlled in Wuhan by 'Fangcang' hospitals. To model the virulence evolution, in this paper, we formulate a new age structured epidemic model. Under the tradeoff hypothesis, two special scenarios are used to study the virulence evolution by theoretical analysis and numerical simulations. Results show that, before 'Fangcang' hospitals, two scenarios are both consistent with the data. After 'Fangcang' hospitals, Scenario I rather than Scenario II is consistent with the data. It is concluded that the transmission pattern of COVID-19 in Wuhan obey Scenario I rather than Scenario II. Theoretical analysis show that, in Scenario I, shortening the value of L (diagnosis period) can result in an enormous selective pressure on the evolution of 2019-nCoV. [ABSTRACT FROM AUTHOR]

Published

2022

49. Hopf bifurcation in delayed nutrient-microorganism model with network structure.

Author

Chen, Mengxin, Zheng, Qianqian, Wu, Ranchao, and Chen, Liping

Subjects

HOPF bifurcations, MULTIPLE scale method

Abstract

In this paper, we introduce and deal with the delayed nutrient-microorganism model with a random network structure. By employing time delay τ as the main critical value of the Hopf bifurcation, we investigate the direction of the Hopf bifurcation of such a random network nutrient-microorganism model. Noticing that the results of the direction of the Hopf bifurcation in a random network model are rare, we thus try to use the method of multiple time scales (MTS) to derive amplitude equation and determine the direction of the Hopf bifurcation. It is showed that the delayed random network nutrient-microorganism model can exhibit a supercritical or subcritical Hopf bifurcation. Numerical experiments are performed to verify the validity of the theoretical analysis. [ABSTRACT FROM AUTHOR]

Published

2022

50. Speed determinacy of travelling waves for a three-component lattice Lotka–Volterra competition system.

Author

Tang, Y., Pan, C., Wang, H., and Ouyang, Z.

Subjects

SPECIES

Abstract

In this paper, the invasive speed selection of the monostable travelling wave for a three-component lattice Lotka–Volterra competition system is studied via the upper and lower solution method, as well as the comparison principle. By constructing several special upper and lower solutions, we establish sufficient conditions such that the linear or nonlinear selection is realized. [ABSTRACT FROM AUTHOR]

Published

2022