Your search keyword '"Fei-ying Yang"' showing total 21 results

1. The generalised principal eigenvalue of time-periodic nonlocal dispersal operators and applications

Author

Fei-Ying Yang, Wan-Tong Li, Yuan-Hang Su, and Yuan Lou

Subjects

Time periodic, Applied Mathematics, 010102 general mathematics, Linear operators, Principal (computer security), Dynamical Systems (math.DS), 01 natural sciences, Stability (probability), 35K57, 35R09, 45C05, 47G20, 92D25, Mathematics - Spectral Theory, 010101 applied mathematics, Nonlinear system, Mathematics - Analysis of PDEs, FOS: Mathematics, Biological dispersal, Applied mathematics, Mathematics - Dynamical Systems, 0101 mathematics, Spectral Theory (math.SP), Equivalence (measure theory), Analysis, Eigenvalues and eigenvectors, Analysis of PDEs (math.AP), Mathematics

Abstract

This paper is mainly concerned with the generalised principal eigenvalue for time-periodic nonlocal dispersal operators. We first establish the equivalence between two different characterisations of the generalised principal eigenvalue. We further investigate the dependence of the generalised principal eigenvalue on the frequency, the dispersal rate and the dispersal spread. Finally, these qualitative results for time-periodic linear operators are applied to time-periodic nonlinear KPP equations with nonlocal dispersal, focusing on the effects of the frequency, the dispersal rate and the dispersal spread on the existence and stability of positive time-periodic solutions to nonlinear equations., Comment: 24 pages

Published

2020

2. Asymptotic behaviors for nonlocal diffusion equations about the dispersal spread

Author

Wan-Tong Li, Fei-Ying Yang, and Yuan-Hang Su

Subjects

Applied Mathematics, Operator (physics), 010102 general mathematics, 01 natural sciences, Mathematics - Spectral Theory, 010101 applied mathematics, Mathematics - Analysis of PDEs, 35R09, 45C05, 45M05, 45M20, 92D25, FOS: Mathematics, Neumann boundary condition, Biological dispersal, 0101 mathematics, Diffusion (business), Spectral Theory (math.SP), Analysis, Analysis of PDEs (math.AP), Mathematics, Mathematical physics

Abstract

This paper studies the effects of the dispersal spread, which characterizes the dispersal range, on nonlocal diffusion equations with the nonlocal dispersal operator $\frac{1}{\sigma^{m}}\int_{\Omega}J_{\sigma}(x-y)(u(y,t)-u(x,t))dy$ and Neumann boundary condition in the spatial heterogeneity environment. More precisely, we are mainly concerned with asymptotic behaviors of generalised principal eigenvalue to the nonlocal dispersal operator, positive stationary solutions and solutions to the nonlocal diffusion KPP equation in both large and small dispersal spread. For large dispersal spread, we show that their asymptotic behaviors are unitary with respect to the cost parameter $m\in[0,\infty)$. However, small dispersal spread can lead to different asymptotic behaviors as the cost parameter $m$ is in a different range. In particular, for the case $m=0$, we should point out that asymptotic properties for the nonlocal diffusion equation with Neumann boundary condition are different from those for the nonlocal diffusion equation with Dirichlet boundary condition., Comment: 24 pages

Published

2020

3. Traveling waves of a nonlocal dispersal SEIR model with standard incidence

Author

Fei-Ying Yang, Shao-Xia Qiao, and Wan-Tong Li

Subjects

Coupling, Laplace transform, Applied Mathematics, 010102 general mathematics, Mathematical analysis, General Engineering, General Medicine, Wave speed, 01 natural sciences, 010101 applied mathematics, Computational Mathematics, Traveling wave, Biological dispersal, Point (geometry), 0101 mathematics, Epidemic model, General Economics, Econometrics and Finance, Analysis, Mathematics, Incidence (geometry)

Abstract

This paper is devoted to investigating the traveling wave solutions of a nonlocal dispersal SEIR epidemic model with standard incidence. We find that the existence and nonexistence of traveling wave solutions are determined by the basic reproduction number and the critical wave speed. Through considering a truncate problem, combining with Schauder’s fixed-point theorem and applying a limiting argument, we prove the existence of traveling wave solutions. Meanwhile, the nonexistence of traveling wave solutions is showed by the Laplace transform method. Furthermore, the existence of traveling wave solutions with critical wave speed is also established by a delicate analysis. We also point out that both the nonlocal dispersal and coupling of system in the model bring some difficulties in the study of traveling wave solutions.

Published

2019

4. Dynamics of a nonlocal dispersal SIS epidemic model with Neumann boundary conditions

Author

Fei-Ying Yang, Shigui Ruan, and Wan-Tong Li

Subjects

Applied Mathematics, Diffusion operator, 010102 general mathematics, 01 natural sciences, Spatial heterogeneity, 010101 applied mathematics, Infectious disease (medical specialty), Neumann boundary condition, Quantitative Biology::Populations and Evolution, Biological dispersal, Statistical physics, Uniqueness, 0101 mathematics, Epidemic model, Basic reproduction number, Analysis, Mathematics

Abstract

In this paper we study a nonlocal dispersal susceptible-infected-susceptible (SIS) epidemic model with Neumann boundary condition, where the spatial movement of individuals is described by a nonlocal (convolution) diffusion operator, the transmission rate and recovery rate are spatially heterogeneous, and the total population number is constant. We first define the basic reproduction number R 0 and discuss the existence, uniqueness and stability of steady states of the nonlocal dispersal SIS epidemic model in terms of R 0 . Then we consider the impacts of the large diffusion rates of the susceptible and infectious populations on the persistence and extinction of the disease. The obtained results indicate that the nonlocal movement of the susceptible or infectious individuals will enhance the persistence of the infectious disease. In particular, our analytical results suggest that the spatial heterogeneity tends to boost the spread of the infectious disease.

Published

2019

5. Wave propagation for a class of non-local dispersal non-cooperative systems

Author

Jia-Bing Wang, Fei-Ying Yang, and Wan-Tong Li

Subjects

Class (set theory), Wave propagation, General Mathematics, 010102 general mathematics, Mathematical analysis, Bilinear interpolation, Non local, 01 natural sciences, 010101 applied mathematics, Traveling wave, Biological dispersal, 0101 mathematics, Epidemic model, Mathematics, Incidence (geometry)

Abstract

This paper is concerned with the travelling waves for a class of non-local dispersal non-cooperative system, which can model the prey-predator and disease-transmission mechanism. By the Schauder's fixed-point theorem, we first establish the existence of travelling waves connecting the semi-trivial equilibrium to non-trivial leftover concentrations, whose bounds are deduced from a precise analysis. Further, we characterize the minimal wave speed of travelling waves and obtain the non-existence of travelling waves with slow speed. Finally, we apply the general results to an epidemic model with bilinear incidence for its propagation dynamics.

Published

2019

6. Traveling waves in a nonlocal dispersal SIR model with critical wave speed

Author

Wan-Tong Li and Fei-Ying Yang

Subjects

Applied Mathematics, 010102 general mathematics, Mathematical analysis, Bilinear interpolation, Wave speed, 01 natural sciences, 010101 applied mathematics, Classical mechanics, Traveling wave, Biological dispersal, 0101 mathematics, Epidemic model, Analysis, Incidence (geometry), Mathematics

Abstract

This paper is concerned with the existence of traveling waves for a nonlocal dispersal Kermack–McKendrick epidemic model. As we know, due to the semiflow generated by the model does not have the order-preserving property and the solutions lack of regularity, it is difficult to investigate traveling waves with the critical wave speed. Furthermore, the nonlocal dispersal and bilinear incidence bring additional difficulties to get the boundedness of traveling waves. In the present paper, we overcome these difficulties to obtain the boundedness of traveling waves by analysis technique firstly and then prove the existence of traveling waves under the critical wave speed.

Published

2018

7. Traveling waves in a nonlocal dispersal SIRH model with relapse

Author

Fei-Ying Yang, Cheng-Cheng Zhu, and Wan-Tong Li

Subjects

010102 general mathematics, Mathematical analysis, Wave speed, 01 natural sciences, 010101 applied mathematics, Computational Mathematics, Computational Theory and Mathematics, Modeling and Simulation, Ordinary differential equation, Traveling wave, Biological dispersal, 0101 mathematics, Basic reproduction number, Mathematics

Abstract

This paper is concerned with traveling wave solutions of a nonlocal dispersal SusceptibleInfectiveRemovalHealing (for short SIRH ) model with relapse. It is found that the existence and nonexistence of traveling waves of the system are not only determined by the critical wave speed c, but also by the basic reproduction number R0 of the corresponding system of ordinary differential equations. More precisely, we use Schauders fixed-point theorem to obtain the existence of traveling waves for R0>1 and c>c, and the nonexistence of traveling waves for R0>1 and 0

Published

2017

8. Traveling waves in a nonlocal dispersal SIR model with non-monotone incidence

Author

Fei-Ying Yang, Yan-Xia Feng, and Wan-Tong Li

Subjects

Numerical Analysis, Diffusion (acoustics), Applied Mathematics, Numerical analysis, Mathematical analysis, 01 natural sciences, 010305 fluids & plasmas, Operator (computer programming), Critical speed, Modeling and Simulation, Bounded function, 0103 physical sciences, Biological dispersal, 010306 general physics, Epidemic model, Mathematics, Incidence (geometry)

Abstract

It is well-known that the nonlocal dispersal operator has the advantage of capturing short-range as well as long-range factors for the dispersal of the spices by choosing the kernel function properly, and is also capable to include spatial dispersal strategies of the species beyond random (local) diffusion. This paper is concerned with the existence and nonexistence of traveling wave solutions for a nonlocal dispersal Kermack-McKendrick epidemic model with non-monotone incidence, which is a non-monotone system. The method of sub and super solutions combined with Schauder’s fixed-point theorem is applied to establish the existence of positive traveling waves as the wave speed is over critical speed. We further prove the existence of traveling waves with critical speed and the nonexistence of bounded positive traveling waves by the delicate analysis method. The main difficulty is to get the boundedness of traveling waves caused by the nonlocal dispersal operator.

Published

2021

9. TRAVELING WAVES OF A REACTION-DIFFUSION SIRQ EPIDEMIC MODEL WITH RELAPSE

Author

Fei-Ying Yang, Cheng-Cheng Zhu, and Wan-Tong Li

Subjects

General Mathematics, 010102 general mathematics, Mathematical analysis, Dynamics (mechanics), Wave speed, 01 natural sciences, 010101 applied mathematics, Lyapunov functional, Reaction–diffusion system, Traveling wave, 0101 mathematics, Epidemic model, Basic reproduction number, Mathematics

Abstract

This paper is concerned with the traveling waves of a reaction diffusion SIRQ epidemic model with relapse. We find that the existence and nonexistence of traveling waves are determined by the basic reproduction number of the system and the minimal wave speed. This threshold dynamics is proved by Schauder's fixed-point theorem combining Lyapunov functional with the theory of asymptotic spreading. Moreover, the numerical simulations are provided to illustrate our analytical results and the effect of the relapse is also discussed.

Published

2017

10. Effects of nonlocal dispersal and spatial heterogeneity on total biomass

Author

Fei-Ying Yang, Wan-Tong Li, and Yuan-Hang Su

Subjects

Steady state, Applied Mathematics, 010102 general mathematics, Order (ring theory), Function (mathematics), 01 natural sciences, 010101 applied mathematics, Exponential stability, Discrete Mathematics and Combinatorics, Biological dispersal, Applied mathematics, Carrying capacity, Uniqueness, 0101 mathematics, Logistic function, Mathematics

Abstract

In this paper, we investigate the effects of nonlocal dispersal and spatial heterogeneity on the total biomass of species via nonlocal dispersal logistic equations. In order to make the model more relevant for real biological systems, we consider a logistic reaction term, with two parameters, \begin{document}$ r(x) $\end{document} for intrinsic growth rate and \begin{document}$ K(x) $\end{document} for carrying capacity. We first establish the existence, uniqueness and asymptotic stability of the positive steady state solution for this equation. And then we study the continuous property and asymptotic limit of the positive steady state solution with respect to the dispersal rate. Finally, the function about the total biomass of species is defined by the positive steady state solution. Our results show in a heterogeneous environment, the total biomass is always strictly greater than the total carrying capacity in the special case when the nonlocal dispersal is allowed.

Published

2017

11. Principal eigenvalues for some nonlocal eigenvalue problems and applications

Author

Fei-Ying Yang, Wan-Tong Li, and Jian-Wen Sun

Subjects

Applied Mathematics, 010102 general mathematics, Principal (computer security), 01 natural sciences, 010101 applied mathematics, Evolution equation, Discrete Mathematics and Combinatorics, Applied mathematics, Uniqueness, Limit (mathematics), 0101 mathematics, Divide-and-conquer eigenvalue algorithm, Analysis, Eigenvalues and eigenvectors, Eigenvalue perturbation, Mathematics

Abstract

This paper is concerned with the principal eigenvalues of some nonlocal operators. We first derive a result on the limit of certain sequences of principal eigenvalues associated with some nonlocal eigenvalue problems. Then, such a result is used to study the existence, uniqueness and asymptotic behavior of positive solutions to a nonlocal stationary problem with a parameter. Finally, the long-time behavior of the solutions of the corresponding nonlocal evolution equation and the asymptotic behavior of positive stationary solutions on parameter are discussed.

Published

2016

12. Traveling waves in a nonlocal dispersal SIR epidemic model

Author

Zhi-Cheng Wang, Wan-Tong Li, and Fei-Ying Yang

Subjects

Laplace transform, Applied Mathematics, Mathematical analysis, General Engineering, Fixed-point theorem, General Medicine, Wave speed, Computational Mathematics, Traveling wave, Biological dispersal, Epidemic model, General Economics, Econometrics and Finance, Basic reproduction number, Analysis, Mathematics

Abstract

This paper is concerned with traveling wave solutions of a nonlocal dispersal SIR epidemic model. The existence and nonexistence of traveling wave solutions are determined by the basic reproduction number and the minimal wave speed. This threshold dynamics are proved by Schauder’s fixed point theorem and the Laplace transform. The main difficulties are that the semiflow generated by the model does not have the order-preserving property and the solutions lack of regularity.

Published

2015

13. Blow-up profiles for positive solutions of nonlocal dispersal equation

Author

Jian-Wen Sun, Wan-Tong Li, and Fei-Ying Yang

Subjects

Applied Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Biological dispersal, Domain (mathematical analysis), Mathematics

Abstract

In this paper, we study the blow-up profiles of the nonlocal dispersal equation. More precisely, we prove that the positive solution of nonlocal dispersal equation has different blow-up profiles, depending on the refuge domain.

Published

2015

14. Traveling waves for a nonlocal dispersal SIR model with delay and external supplies

Author

Fei-Ying Yang, Yan Li, and Wan-Tong Li

Subjects

Computational Mathematics, Mathematical optimization, Applied Mathematics, Spatial movement, Mathematical analysis, Traveling wave, Biological dispersal, Reaction system, Wave speed, Latency (engineering), Epidemic model, Constant (mathematics), Mathematics

Abstract

This paper is concerned with the existence, nonexistence and minimal wave speed of traveling waves of a nonlocal dispersal delayed SIR model with constant external supplies and Holling-II incidence rate. We find that the existence and nonexistence of traveling waves of the system are not only determined by the minimal wave speed c ? , but also by the so-called basic reproduction number R 0 of the corresponding reaction system. That is, we establish the existence of traveling waves for R 0 1 and each wave speed c ? c ? , and the nonexistence for R 0 1 and any 0 < c < c ? or R 0 < 1 . We also discuss how the latency of infection and the spatial movement of the infective individuals affect the minimal wave speed. Biologically speaking, the longer the latency of infection in a vector is, the slower the disease spreads.

Published

2014

15. A nonlocal dispersal equation arising from a selection–migration model in genetics

Author

Wan-Tong Li, Jian-Wen Sun, and Fei-Ying Yang

Subjects

Genetics, Compact space, Maximum principle, Exponential stability, Applied Mathematics, Stability (learning theory), Biological dispersal, Initial value problem, Uniqueness, Instability, Analysis, Mathematics

Abstract

This paper is concerned with the existence, uniqueness and asymptotic stability of positive steady-states for a nonlocal dispersal equation arising from selection–migration models in genetics. Due to the lack of compactness and regularity of the nonlocal operators, many classical methods cannot be used directly to the nonlocal dispersal problems. This motivates us to find new techniques. We first establish a criterion on the stability and instability of steady-states. This result is effective to get a necessary condition to guarantee a positive steady-state, it also gives the uniqueness. Then we prove the existence of nontrivial solutions by the corresponding auxiliary equations and maximum principle. Finally, we consider the dynamic behavior of the initial value problem.

Published

2014

16. Traveling wave solutions of a nonlocal delayed SIR model without outbreak threshold

Author

Fei-Ying Yang, Guo Lin, Cong Ma, and Wan-Tong Li

Subjects

Moment (mathematics), Mathematical optimization, Applied Mathematics, Traveling wave, Quantitative Biology::Populations and Evolution, Discrete Mathematics and Combinatorics, Applied mathematics, Outbreak, Epidemic model, Mathematics

Abstract

This paper is concerned with the traveling wave solutions of a diffusive SIR system with nonlocal delay. We obtain the existence and nonexistence of traveling wave solutions, which formulate the propagation of disease without outbreak threshold. Moreover, it is proved that at any fixed moment, the faster the disease spreads, the more the infected individuals, and the larger the recovery/remove ratio is, the less the infected individuals.

Published

2014

17. A free boundary problem of a diffusive SIRS model with nonlinear incidence

Author

Wan-Tong Li, Jia-Feng Cao, Fei-Ying Yang, and Jie Wang

Subjects

Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, General Physics and Astronomy, Bilinear interpolation, Boundary (topology), Nonlinear incidence, 01 natural sciences, 010101 applied mathematics, Disease spreading, Calculus, Free boundary problem, 0101 mathematics, Mathematics

Abstract

This paper is concerned with the spreading (persistence) and vanishing (extinction) of a disease which is characterized by a diffusive SIRS model with a bilinear incidence rate and free boundary. Through discussing the dynamics of a free boundary problem of an SIRS model, the spreading of a disease is described. We get the sufficient conditions which ensure the disease spreading or vanishing. In addition, the estimate of the expanding speed is also given when the free boundaries extend to the whole $$\mathbb {R}$$ .

Published

2017

18. Traveling waves in a nonlocal dispersal Kermack-McKendrick epidemic model

Author

Yan Li, Zhi-Cheng Wang, Fei-Ying Yang, and Wan-Tong Li

Subjects

Compact space, Laplace transform, Kernel (image processing), Applied Mathematics, Bounded function, Mathematical analysis, Discrete Mathematics and Combinatorics, Fixed-point theorem, Invariant (mathematics), Epidemic model, Domain (mathematical analysis), Mathematics

Abstract

In this paper, we consider a Kermack-McKendrick epidemic model with nonlocal dispersal. We find that the existence and nonexistence of traveling wave solutions are determined by the reproduction number. To prove the existence of nontrivial traveling wave solutions, we construct an invariant cone in a bounded domain with initial functions being defined on, and apply Schauder's fixed point theorem as well as limiting argument. Here, the compactness of the support set of dispersal kernel is needed when passing to an unbounded domain in the proof. Moreover, the nonexistence of traveling wave solutions is obtained by Laplace transform if the speed is less than the critical velocity.

Published

2013

19. Approximate the Fokker–Planck equation by a class of nonlocal dispersal problems

Author

Jian-Wen Sun, Fei-Ying Yang, and Wan-Tong Li

Subjects

Diffusion equation, Applied Mathematics, Kernel (statistics), Operator (physics), Mathematical analysis, Fokker–Planck equation, Limit (mathematics), Diffusion (business), Convection–diffusion equation, Scaling, Analysis, Mathematics

Abstract

This paper is concerned with an inhomogeneous nonlocal dispersal equation. We study the limit of the re-scaled problem of this nonlocal operator and prove that the solutions of the re-scaled equation converge to a solution of the Fokker–Planck equation uniformly. We then analyze the nonlocal dispersal equation of an inhomogeneous diffusion kernel and find that the heterogeneity in the classical diffusion term coincides with the inhomogeneous kernel when the scaling parameter goes to zero.

Published

2011

20. Dynamics of a Nonlocal Dispersal SIS Epidemic Model

Author

Fei-Ying Yang and Wan-Tong Li

Subjects

Applied Mathematics, 010102 general mathematics, Dynamics (mechanics), 35B40, General Medicine, 01 natural sciences, Domain (mathematical analysis), 010101 applied mathematics, symbols.namesake, Mathematics - Analysis of PDEs, Dirichlet boundary condition, symbols, FOS: Mathematics, Applied mathematics, Biological dispersal, 0101 mathematics, Epidemic model, Basic reproduction number, Disease transmission, Analysis, Mathematics, Analysis of PDEs (math.AP)

Abstract

This paper is concerned with a nonlocal dispersal susceptible-infected-susceptible (SIS) epidemic model with Dirichlet boundary condition, where the rates of disease transmission and recovery are assumed to be spatially heterogeneous. We introduce a basic reproduction number $R_0$ and establish threshold-type results on the global dynamic in terms of $R_0$. More specifically, we show that if the basic reproduction number is less than one, then the disease will be extinct, and if the basic reproduction number is larger than one, then the disease will persist. Particularly, our results imply that the nonlocal dispersal of the infected individuals may suppress the spread of the disease even though in a high-risk domain., Comment: 21 pages

Published

2016

21. Traveling waves for a nonlocal dispersal SIR model with standard incidence

Author

Fei-Ying Yang and Wan-Tong Li

Subjects

Schauder's fixed point theorem, Numerical Analysis, Traveling waves, Laplace transform, Applied Mathematics, Mathematical analysis, Fixed-point theorem, 92D25, Cone (topology), nonlocal dispersal, 35R20, 35K57, Differential (infinitesimal), Invariant (mathematics), SIR model, Epidemic model, Basic reproduction number, Mathematics, Incidence (geometry)

Abstract

This paper is concerned with traveling wave solutions of a nonlocal dispersal SIR epidemic model with standard incidence. We show that our results on existence and nonexistence of traveling wave solutions are determined by the basic reproduction number of the corresponding ordinary differential model and the minimal wave speed. These threshold dynamics are proved by constructing an invariant cone and applying Schauder's fixed point theorem on this cone and the Laplace transform. The main difficulties are the lack of an occurrence of a regularizing effect and the loss of the order-preserving property of this model.

Published

2014