一类浮游动植物模型的全局稳定性（英文）

张真真; 曼合布拜·热合木

doi:10.13568/j.cnki.651094.2015.04.005

您当前的位置：

首页 >

文章列表页 >

一类浮游动植物模型的全局稳定性（英文）

数理科学 | 更新时间：2026-01-21

- 一类浮游动植物模型的全局稳定性（英文）
- 一类浮游动植物模型的全局稳定性（英文）
- 新疆大学学报（自然科学版中英文） 2015年32卷第4期页码：410-417
- 作者机构：
  
  新疆大学数学与系统科学学院
- 作者简介：
- 基金信息：
  
  supported by the National Natural Science Foundation of China(11261058)
- DOI：10.13568/j.cnki.651094.2015.04.005
  中图分类号： O175
- 纸质出版：2015
- 稿件说明：
移动端阅览
[1]张真真,曼合布拜·热合木.一类浮游动植物模型的全局稳定性（英文）[J].新疆大学学报(自然科学版),2015,32(04):410-417.
[1]张真真,曼合布拜·热合木.一类浮游动植物模型的全局稳定性（英文）[J].新疆大学学报(自然科学版),2015,32(04):410-417. DOI： 10.13568/j.cnki.651094.2015.04.005.

DOI：10.13568/j.cnki.651094.2015.04.005.

摘要

提出了一种浮游植物和两种浮游动物相互作用的模型.模型考虑了对各种群的捕获率

分析和研究了模型中各平衡点存在和稳定的充分条件

数值模拟验证了主要的定理结果的正确性.

Abstract

In this paper

we describe a two-zooplankton one-phytoplankton system that exhibits a Holling type II functional response for the grazing of phytoplankton by zooplankton. Combined e?ort(E) is used to harvest the population.We consider the impact of harvesting on the coexistence of competitive predators. We firstly consider the positivity and boundedness of the solution and existence of equilibria. Secondly

stability criteria of the model is analyzed both from local and global point of view. Theoretical results of this paper justified with numerical simulations.

关键词

Keywords

references

Abdllaoui A E,Chattopadhyay J,Arino O.Comparisons,by models,of some basic mechanisms acting on the dynamics of the zooplanktontoxic phytoplankton system[J].Mathematical models and Methods in Applied Sciences,2002,12(10):1421-1451.

Odum E P.Fundamentals of Ecology[M].Philadelphia:Saunders,1971.

Duinker J,Wefer G.Das CO2-Problem und die Rolle des Ozeans[J],Naturwissenschahten,1994,81(6):237-242.

Saha T,Bandyopadhyay M.Dynamical analysis of toxin producing phytoplankton-zooplankton interactions[J].Nonlinear Analysis:Real World Applications,2009,10(1):314-332.

Huppert A,Olinkly R,Stone L.Bottom-up excitable models of phytoplankton blooms[J].Bull Math Biol,2004,66(4):865-878.

Pei Y,Lv Y,Li C.Evolutionary consequences of harvesting for a two-zooplankton one-phytoplankton system[J].Appl Math Model,2012,36(4):1752-1765.

Chakraborty K,Das K.Modeling and analysis of a two-zooplankton one-phytoplankton system in the presence of toxicity[J].App Math Model,2014,39:1241-1265.

Lv Y,Pei Y,Gao S,Li C.Harvesting of a phytoplankton-zooplankton model[J].Nonlinear Analysis:Real World Applications,2010,11(5):3608-3619.

Mukhopadhyay B,Bhattacharyya R.Modelling phytoplankton allelopathy in a nutrient-plankton model with spatial heterogeneity[J].Ecol Model,2006,198:163-173.

Nakaoka S,Takeuchi Y.Competition in chemostat-type equations with two habitas[J].Math Biosci,2006,201:157-171.

Ruan S,Ardito A,Ricciardi P,De Angelis D.Coexistence in competition models with density dependent mortality[J].Biol CR,2007,330:845-854.

Zhang T,Wang W.Hopf bifurcation and bistability of a nutrient phytoplankton-zooplankton model[J].Appl Math Model,2012,36:6225-6235.

Rhodes C J,Martin AP.The influence of viral infection on a plankton ecosystem undergoing nutrient enrichment[J].J Theor Biol,2010,265(3):225-237.

Clark C W.Mathematical Bioeconomics[M].New York:The optimal Management of Renewable Resources,2nd ed,John Wiley and Sons,1990.

浏览量

下载量

CSCD

文章被引用时，请邮件提醒。

提交

工具集

关联资源

暂无数据