Existence of positive periodic solutions of impulsive functional differential equations with two parameters
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[1] Hai-Feng Huo,et al. Existence and global attractivity of positive periodic solutions of functional differential equations with impulses , 2004 .
[2] W. Ames,et al. Nonlinear problems in abstract cones , 1988 .
[3] Guang Zhang,et al. Existence of Positive Periodic Solutions for Non-Autonomous Functional Differential Equations , 2001 .
[4] Jurang Yan. Existence and global attractivity of positive periodic solution for an impulsive Lasota–Wazewska model , 2003 .
[5] Kenneth L. Cooke,et al. A periodicity threshold theorem for epidemics and population growth , 1976 .
[6] Haiyan Wang. Positive periodic solutions of functional differential equations , 2004 .
[7] G. Ladas,et al. Oscillation Theory of Delay Differential Equations: With Applications , 1992 .
[8] Daqing Jiang,et al. EXISTENCE OF POSITIVE PERIODIC SOLUTIONS FOR FUNCTIONAL DIFFERENTIAL EQUATIONS , 2002 .
[9] John Mallet-Paret,et al. Global continuation and asymptotic behaviour for periodic solutions of a differential-delay equation , 1986 .
[10] Jim M Cushing,et al. Periodic Time-Dependent Predator-Prey Systems , 1977 .
[11] James A. Yorke,et al. Some equations modelling growth processes and gonorrhea epidemics , 1973 .
[12] L. Glass,et al. Oscillation and chaos in physiological control systems. , 1977, Science.
[13] S. P. Blythe,et al. Nicholson's blowflies revisited , 1980, Nature.
[14] Daqing Jiang,et al. Existence and multiplicity of positive periodic solutions to functional differential equations with impulse effects , 2005 .
[15] K. Gopalsamy. Stability and Oscillations in Delay Differential Equations of Population Dynamics , 1992 .
[16] Leo F. Boron,et al. Positive solutions of operator equations , 1964 .
[17] Jianhong Wu,et al. Periodic solutions of single-species models with periodic delay , 1992 .
[18] K. Deimling. Nonlinear functional analysis , 1985 .