Your search keyword '"Li, Wan"' showing total 5 results

1. Asymptotic behavior of traveling fronts and entire solutions for a periodic bistable competition–diffusion system.

Author

Du, Li-Jun, Li, Wan-Tong, and Wang, Jia-Bing

Subjects

*FLIP-flop circuits, *DIFFERENTIAL equations, *MATHEMATICAL physics, *BERNOULLI equation, *BESSEL functions

Abstract

Abstract This paper is concerned with a time periodic competition–diffusion system { u t = u x x + u (r 1 (t) − a 1 (t) u − b 1 (t) v) , t > 0 , x ∈ R , v t = d v x x + v (r 2 (t) − a 2 (t) u − b 2 (t) v) , t > 0 , x ∈ R , where u (t , x) and v (t , x) denote the densities of two competing species, d > 0 is some constant, r i (t) , a i (t) and b i (t) are T -periodic continuous functions. Under suitable conditions, it has been confirmed by Bao and Wang (2013) [2] that this system admits periodic traveling fronts connecting two stable semi-trivial T -periodic solutions (p (t) , 0) and (0 , q (t)) associated to the corresponding kinetic system. In the present work, we first investigate the asymptotic behavior of periodic bistable traveling fronts with non-zero speeds at infinity by a dynamical approach combined with the two-sided Laplace transform method. With these asymptotic properties, we then obtain some key estimates. As a result, by applying the super- and subsolutions techniques as well as the comparison principle, we establish the existence and various qualitative properties of the so-called entire solutions defined for all time and the whole space, which provides some new spreading ways other than periodic traveling waves for two strongly competing species interacting in a heterogeneous environment. [ABSTRACT FROM AUTHOR]

Published

2018

2. Fast propagation for reaction–diffusion cooperative systems.

Author

Xu, Wen-Bing, Li, Wan-Tong, and Ruan, Shigui

Subjects

*BURGERS' equation, *HEAT equation, *SPECIES, *DIFFERENTIAL equations, *MATHEMATICAL functions

Abstract

This paper deals with the spatial propagation for reaction–diffusion cooperative systems. It is well-known that the solution of a reaction–diffusion equation with monostable nonlinearity spreads at a finite speed when the initial condition decays to zero exponentially or faster, and propagates fast when the initial condition decays to zero more slowly than any exponentially decaying function. However, in reaction–diffusion cooperative systems, a new possibility happens in which one species propagates fast although its initial condition decays exponentially or faster. The fundamental reason is that the growth sources of one species come from the other species. Simply speaking, we find a new interesting phenomenon that the spatial propagation of one species is accelerated by the other species. This is a unique phenomenon in reaction–diffusion systems. We present a framework of fast propagation for reaction–diffusion cooperative systems. [ABSTRACT FROM AUTHOR]

Published

2018

3. Periodic pyramidal traveling fronts of bistable reaction–diffusion equations with time-periodic nonlinearity

Author

Sheng, Wei-Jie, Li, Wan-Tong, and Wang, Zhi-Cheng

Subjects

*HEAT equation, *SOLID state physics, *NONLINEAR theories, *DIFFERENTIAL equations, *ASYMPTOTIC theory of algebraic ideals, *STABILITY (Mechanics), *MATHEMATICAL analysis

Abstract

Abstract: This paper deals with the existence and stability of periodic pyramidal traveling fronts for reaction–diffusion equations with bistable time-periodic nonlinearity in with . It is well known that two-dimensional periodic traveling curved fronts exist and are stable. In this paper, by constructing various of supersolutions and subsolutions, we first show that there exist three-dimensional periodic pyramidal traveling fronts, and then we prove that such periodic pyramidal traveling fronts are asymptotically stable. Finally, we further prove that our existence result holds for with . [Copyright &y& Elsevier]

Published

2012

4. Entire solutions in monostable reaction–diffusion equations with delayed nonlinearity

Author

Li, Wan-Tong, Wang, Zhi-Cheng, and Wu, Jianhong

Subjects

*BURGERS' equation, *HEAT equation, *DIFFERENTIAL equations, *ASYMPTOTIC theory of algebraic ideals, *PARABOLIC differential equations

Abstract

Abstract: Entire solutions for monostable reaction–diffusion equations with nonlocal delay in one-dimensional spatial domain are considered. A comparison argument is employed to prove the existence of entire solutions which behave as two traveling wave solutions coming from both directions. Some new entire solutions are also constructed by mixing traveling wave solutions with heteroclinic orbits of the spatially averaged ordinary differential equations, and the existence of such a heteroclinic orbit is established using the monotone dynamical systems theory. Key techniques include the characterization of the asymptotic behaviors of solutions as in term of appropriate subsolutions and supersolutions. Two models of reaction–diffusion equations with nonlocal delay arising from mathematical biology are given to illustrate main results. [Copyright &y& Elsevier]

Published

2008

5. Existence theory for positive solutions to one-dimensional p-Laplacian boundary value problems on time scales

Author

Sun, Hong-Rui and Li, Wan-Tong

Subjects

*DIFFERENTIAL equations, *COMPLEX variables, *MATHEMATICAL physics, *BOUNDARY value problems

Abstract

Abstract: In this paper we consider the one-dimensional p-Laplacian boundary value problem on time scales where is p-Laplacian operator, i.e., , . Some new results are obtained for the existence of at least single, twin or triple positive solutions of the above problem by using Krasnosel''skii''s fixed point theorem, new fixed point theorem due to Avery and Henderson and Leggett–Williams fixed point theorem. This is probably the first time the existence of positive solutions of one-dimensional p-Laplacian boundary value problems on time scales has been studied. [Copyright &y& Elsevier]

Published

2007