| File | |
| language |
eng
|
| Author |
Zheng, Wei
Department of Mathematics, Shimane University, Matsue
|
| Description | The model to be dealt in this paper is
N′ = (a + ch(t) − dh(t)N − bP)N, P′ = (− c + dN)P. Here, h is a nonnegative and locally integrable function. This model is a predator-prey system of LotkaVolterra type with variable coefficients and it has a single interior equilibrium (c/d, a/b). Sufficient conditions are given for the interior equilibrium to be uniformly globally asymptotically stable. One of them is described by using a certain uniform divergence condition on h. Our result is p |
| Subject | Uniform global asymptotic stability
Lotka-Volterra predator-prey model
Uniform divergence
Growth condition
Time-varying system
|
| Journal Title |
Applied Mathematics Letters
|
| Volume | 87
|
| Start Page | 125
|
| End Page | 133
|
| ISSN | 0893-9659
|
| Published Date | 2019-01
|
| DOI | |
| Publisher | Elsevier
|
| NII Type |
Journal Article
|
| Format |
PDF
|
| Text Version |
著者版
|
| OAI-PMH Set |
Faculty of Science and Engineering
|
