Issue |
Math. Model. Nat. Phenom.
Volume 17, 2022
|
|
---|---|---|
Article Number | 1 | |
Number of page(s) | 21 | |
DOI | https://doi.org/10.1051/mmnp/2022002 | |
Published online | 27 January 2022 |
Dynamics of a stochastic population model with Allee effect and jumps
1
School of Applied Mathematics, Shanxi University of Finance and Economics,
Taiyuan,
Shanxi
030006, PR China.
2
School of Mathematical Sciences, Shanxi University,
Taiyuan,
Shanxi
030006, PR China.
* Corresponding author: lgr5791@sxu.edu.cn
Received:
21
August
2021
Accepted:
10
January
2022
This paper is concerned with a stochastic population model with Allee effect and jumps. First, we show the global existence of almost surely positive solution to the model. Next, exponential extinction and persistence in mean are discussed. Then, we investigated the global attractivity and stability in distribution. At last, some numerical results are given. The results show that if attack rate a is in the intermediate range or very large, the population will go extinct. Under the premise that attack rate a is less than growth rate r, if the noise intensity or jump is relatively large, the population will become extinct; on the contrary, the population will be persistent in mean. The results in this paper generalize and improve the previous related results.
Mathematics Subject Classification: 60H10 / 60J60 / 92D25 / 92D40
Key words: Lévy noise / Allee effect / extinction / attractivity / stability
© The authors. Published by EDP Sciences, 2022
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