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一类具有交叉扩散的捕食模型的整体分歧 被引量:8

Global Bifurcation for a Predator-prey Model with Cross-diffusion
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摘要 研究了一类具有交叉扩散的捕食模型在齐次Dirichlet边界条件下正解的存在性.由极大值原理得到正解的先验估计.利用Crandall-Rabinowitz分歧理论,给出局部分歧正解的存在性,并将局部分歧延拓为整体分歧,从而得到正解存在的充分条件.结果表明,捕食者和被捕食者在一定条件下可以共存. The existence of positive solutions for a predator-prey model with cross-diffusion under homogeneous Dirichlet boundary conditions is studied.By the maximum principle,some a priori estimates are firstly obtained.Then by Crandall-Rabinowitz local bifurcation theory,positive solutions emanating from the semi-trivial solutions are derived.And resorting to the global bifurcation theory,we extend the local bifurcation solution to the global one.The results obtained show that the predator and the prey can co-exist under certain conditions.
作者 马晓丽
机构地区 西安工业大学数理系
出处 《西安工业大学学报》 CAS 2010年第5期506-510,共5页 Journal of Xi’an Technological University
基金 陕西省教育厅科学研究计划项目(09JK480) 西安工业大学校长基金(XAGDXJJ0803)
关键词 捕食-食饵 交叉扩散 分歧 先验估计 predator-prey cross-diffusion bifurcation a priori estimate
分类号 O175.26 [理学—基础数学]
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参考文献8

  • 1Aziz-Alaoui M A,Okiye M D. Boundedness and Global Stability for a Predator-prey Model with Modified Leslie-gower and Holling-type II Schemes[J]. Appl Math Lett, 2003,16 : 1069.
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  • 7Wu J H. Global Bifurcation of Coexistence State for the Competition Model in the Chemostat[J]. Nonlinear Analysis, 2000,39 (7) : 817.
  • 8Smoller J. Shock Waves and Reaction-diffusion Equations[M]. New York: Springer-Verlag, 1999.

二级参考文献20

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共引文献4

同被引文献44

  • 1戴婉仪,付一平.一类交叉扩散系统定态解的分歧与稳定性[J].华南理工大学学报(自然科学版),2005,33(2):99-102. 被引量:7
  • 2李海侠,李艳玲.一类捕食模型正平衡解的整体分歧[J].西北师范大学学报(自然科学版),2006,42(2):8-12. 被引量:5
  • 3叶其孝,李正元.反应扩散方程引论[M].北京:科学出版社,2011.
  • 4Hwang T W. Global analysis of the predator-prey system with Beddington-DeAngelis functional response[J]. J Math Anal Appl, 2002,281 : 395- 401.
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  • 6DeAngelis D L, Goldstein R A, O' neill R V. A model for trophic interaction[J ]. Ecology, 1975,56 (2) : 881 - 892.
  • 7Crandall M G, Rabinowitz P H. Bifurcation from simple ei- genvaluesl[J]. J Functional Analysis, 1971,8 (2) : 321-340.
  • 8Rabinowitz P H. Some global results for nonlinear eigen- value problems [J]. J Functional Analysis, 1971, 7 ( 3 ) : 487-513.
  • 9Wu J H. Global bifurcation of coexistence state for the competition model in the chemostat[J]. Nonlinear Analy- sis,2000,39(7) :817-835.
  • 10Smolter J. Shock waves and reaction-diffusion equations [M]. New York: Springer-Verlag, 1999 : 167- 180.

引证文献8

二级引证文献13

西安工业大学学报
2010年 第5期

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