UNIFORM PERSISTENCE AND GLOBAL ATTRACTIVITY FOR NONAUTONOMOUS COMPETITIVE SYSTEMS WITH DISPERSION 被引量：7

UNIFORM PERSISTENCE AND GLOBAL ATTRACTIVITY FOR NONAUTONOMOUS COMPETITIVE SYSTEMS WITH DISPERSION

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摘要 In this paper, we consider a nonautonomous competitive model with dispersion and a finite number of discrete delays. The system, which consists of two Lotka-Volterra patches, has two competitors: one can disperse between the two patches, but the other is confined to one patch and cannot disperse. Our purpose is to demonstrate that the dispersion rates have no effect on the uniform persistence of the solutions of the system. Furthermore, we establish the conditions under which the system admits a positive periodic solution which attracts all solutions.

作者 SONGXinyu CHENLansun

机构地区 DepartmentofMathematics InstituteofMathematics

出处《Journal of Systems Science & Complexity》 SCIE EI CSCD 2002年第3期307-314,共8页 系统科学与复杂性学报（英文版）

基金 This research is supported by the National Natural Science Foundation of China the Natural Science Foundation of Henan Province.

关键词 Uniform persistence global attractivity dispersion. 生态学均匀持久性整体吸引性非自发竞争系统色散

分类号 Q141 [生物学—生态学] N945.21 [生物学—普通生物学]

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参考文献11

1S. A. Levin, Dispersion and population interactions, The Amer. Naturalist, 1973, 54(2): 315-325. 被引量：1
2S. A. Levin and L. A. Segel, Hypothesis to explain the origin of planktonic patchness, Nature, 1976,259: 659. 被引量：1
3S. A. Levin, Spatial patterning and the structure of ecological communities, In Some Mathematical Questions in Biology, Ⅶ, American Mathematical Society, Providence, 1976. 被引量：1
4A. Hastings, Global stability in Lotka-Volterra systems with diffusion, J. Math. Biol., 1978, 163-168. 被引量：1
5Y. Takeuchi, Global stability in generalized Lotka-Volterra diffusion system, J. Math. Anal. Applic., 1986, 116: 209-221. 被引量：1
6J. K. Hale and P. Waltrnan, Persistence in infinite-dimensional system, SIAM J. Math. Anal.,1989, 20: 388-395. 被引量：1
7P. Waltman, A Brief Survey of Persistence in Dynamical System, Edited by S. Busenberg and M.Martelli, pp. 31-40, Springer, Berlin, 1991. 被引量：1
8W. Wang and Z. Ma, Harmless delays for uniform persistence, J. Math. Anal. Appl., 1991, 158:256-268. 被引量：1
9Z. Lu and Y. Takeuchi, Permanence and global attractivity for competitive Lotka-Volterra systems with delay, Nonlin. Anal. Th. Meth. Appl., 1994, 22(7): 847-856. 被引量：1
10X. Song and L. Chen, Persistence and periodic orbits for two-species predator-prey system with diffusion, Canadian Appl. Math. Quarterly, 1998, 6(3): 233-244. 被引量：1

同被引文献19

1AIELLO W G, FREEDMAN H I. A time-delay model of single-species growth with stage structure [J]. Mathematical Biosciences, 1990, 101 : 139-153. 被引量：1
2CAO Y L, FAN J P, GARD T C. The effects of state-dependent time delay on a stage-structured popu- lation growth model[J].Nonlinear Analysis: Theory, Methods and Applications, 1992, 19(2) : 95-105. 被引量：1
3ZAGHROUT A A S, ATTALAH S H. Analysis of a model of stage-dependent time delay [J].Applied Mathematics and Computation, 1997,77 : 185-194. 被引量：1
4HUO H, LI W, AGARWAL R P. Optimal harvesting and stability for two species stage-structured system with aennibalism[J]. International Applied Mathematics, 2001,6:59-79. 被引量：1
5TANG S Y, CHEN L S. Density-dependent birth rate, birth pulses and their population dynamic consequences[J]. Journal of Mathematical Biology, 2002,44 : 185-199. 被引量：1
6LEVIN S A. Dispersion and populatin interactions [J]. The American Naturalist, 1973,54:315-325. 被引量：1
7HASTINGS A. Global stability in Lotka-volterra systems with diffusion[J]. Journal of Mathematical Biology, 1978, 6:163-168. 被引量：1
8LU Z, CHEN L S. Global attractivity of nonautonomous inshore-offshore fishing models with stage-structure[J].Appliable Analysis, 2002, 81:589-605. 被引量：1
9SONG X Y, CHEN L S. Optimal harvesting and stability for a two species competivite system with stage structure[J].Mathematical Biosciences, 2001,170: 173-186. 被引量：1
10Lingzhen Dong,Lansun Chen,Peilin Shi.Periodic solutions for a two-species nonautonomous competition system with diffusion and impulses[J].Chaos Solitons and Fractals.2006(5) 被引量：1

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1黄利航,冯有前.具有扩散的年龄阶段结构捕食模型的渐近性[J].宁夏大学学报（自然科学版）,2010,31(1):26-30.
2李怀阳,张龙.两斑块单向脉冲扩散的两种群竞争系统的持久性[J].新疆大学学报（自然科学版）,2012,29(3):306-312. 被引量：1
3文乾英,焦建军.具脉冲出生与脉冲输入环境毒素的单种群动力学模型研究[J].数学的实践与认识,2014,44(22):299-304. 被引量：3
4Jianjun Jiao,Shaohong Cai,Yujuan Zhang,Limei Li.Dynamics of a stage-structured single population system with winter hibernation and impulsive effect in polluted environment[J].International Journal of Biomathematics,2016,9(5):277-294. 被引量：1
5刘兰兰,焦建军.毒素具脉冲扩散与输入的单种群动力学模型[J].鞍山师范学院学报,2016,18(6):1-5. 被引量：1
6甘静雯,李帅,宋新宇.具有脉冲入侵的Lotka-Volterra捕食系统的动力学分析[J].信阳师范学院学报（自然科学版）,2018,31(3):362-367. 被引量：4
7郑秀亮,孟晓璐,高亚萍.具有Holling-Ⅱ型功能性反应函数的非自治捕食扩散时滞模型的研究（英文）[J].生物数学学报,2014,29(3):415-429. 被引量：1

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1李梁晨,徐瑞.一类具有时滞和Holling Ⅱ型功能反应的捕食模型的全局稳定性和分支（英文）[J].黑龙江大学自然科学学报,2016,33(3):328-337. 被引量：2
2刘兰兰,焦建军.毒素具脉冲扩散与输入的单种群动力学模型[J].鞍山师范学院学报,2016,18(6):1-5. 被引量：1
3杨秀香.具有环境污染的两种群互惠模型的稳定性分析[J].渭南师范学院学报,2018,33(8):5-10. 被引量：3
4焦建军,曾熙轩,李利梅.毒素脉冲输入与种群脉冲出生切换阶段结构单种群动力学模型研究[J].数学杂志,2018,38(6):1066-1074. 被引量：1
5焦建军,李利梅.污染环境下具瞬时与非瞬时脉冲出生单种群动力学模型研究[J].南京师大学报（自然科学版）,2018,41(4):1-6. 被引量：1
6冯进钤,刘亚妮,王迎宵,李玉婷.Duffing振动系统的全局吸引子研究[J].安徽大学学报（自然科学版）,2019,43(3):11-15. 被引量：2
7马建萍.一类具有交错扩散项的捕食模型的稳定性分析[J].青海师范大学学报（自然科学版）,2020,36(4):1-7.
8张蒙,赵艺,安迪,史明静.疱疹病毒影响下红松鼠保护的状态反馈脉冲控制研究[J].信阳师范学院学报（自然科学版）,2021,34(2):173-176. 被引量：2
9Bing Liu,Le Song,Xin Wang,Baolin Kang.Effects of pollution on individual size of a single species[J].International Journal of Biomathematics,2020,13(8):133-155.
10郭文丹,聂麟飞.基于人口流动的COVID-19传播动力学模型研究[J].新疆大学学报（自然科学版）（中英文）,2022,39(2):161-168. 被引量：2

1TENG Zhidong(Department of Mathematics, Xinjiang University, Urumqi 830046, China).A NOTE ON THE PAPER “UNIFORM PERSISTENCE IN DISCRETE SEMIDYNAMICAL SYSTEM AND ITS APPLICATION”[J].Systems Science and Mathematical Sciences,1999,12(2):145-148. 被引量：1
2LIU Yun Xiao,YANG Jin,ZHAO Zhi Lun,PU Ying Ying,BAI Fan.Bacterial persistence[J].Science China Chemistry,2014,57(12):1625-1633. 被引量：1
3Wei Fengying,Wang Ke.PERSISTENCE OF NONAUTONOMOUS PREDATOR-PREY SYSTEMS WITH INFINITE DELAY[J].Annals of Differential Equations,2007,23(1):78-88. 被引量：2
4Beren W. ROBINSON,David W. PFENNIG.Inducible competitors and adaptive diversification[J].Current Zoology,2013,59(4):537-552.
5陈伯山.ASYMPTOTIC STABILITY OF NONAUTONOMOUS SYSTIMS[J].Chinese Science Bulletin,1991,36(20):1673-1676.
6ZHOU Gang SHI Bao GAI Ming-jiu ZHANG De-cun Institute of Systems Science and Mathematics, Naval Aeronautical and Astronautical University, Yantai264001, China.Positive periodic solution for a nonautonomous periodic model of population with time delays and impulses[J].Applied Mathematics(A Journal of Chinese Universities),2010,25(1):18-24. 被引量：1
7CUI Jin’an,CHEN Lansun Department of Mathematics Xinjiang University,Urumuqi 830046.China Institute of Mothemotics, Academia Sinica, Beijing 100080, China.GLOBAL ASYMPTOTIC STABILITY IN A NONAUTONOMOUS COOPERATIVE SYSTEM[J].Systems Science and Mathematical Sciences,1993,6(1):44-51. 被引量：2
8XIE Zhendong(Department of Automation, Sollth China university of TeChnology, Guangzhou 510640, PRC)TIAN Senping(Department of Industrial Equipment and Control EngilleeTing, South Chilla University ofTechnologyl Guangzhou 510640, PRC)LIU Yongqing(Departm.Existence and Stability of Positive PeriodicSolution of Delay Logistic Ecosystem with Feedback Control and Diffusion[J].Systems Science and Systems Engineering,1999,9(2):129-139.
9LI Xuezhi (Department of Mathematics, Xinyang Teachers College, Henan 464000, China) GENI Gupur (Deportment of Mathematics, Xinjiang University, Urumqi 830046, China) ZHU Guangtian (Institute of Systems Science, Academy of Mathematics and Systems Science,.THE CRITERIA OF ULTIMATE BOUNDEDNESS FOR NONAUTONOMOUS DIFFUSIVE LOTKA-VOLTERRA SYSTEMS IN TWO HETEROGENEOUS PATCHES[J].Journal of Systems Science & Complexity,2001,14(2):179-188.
10蒋利群.变时滞多维Lotka-Volterra竞争差分系统正周期解的存在性[J].吉首大学学报（自然科学版）,2004,25(3):36-39.

Journal of Systems Science & Complexity

2002年第3期

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UNIFORM PERSISTENCE AND GLOBAL ATTRACTIVITY FOR NONAUTONOMOUS COMPETITIVE SYSTEMS WITH DISPERSION 被引量：7

参考文献11

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