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Zbl 1156.34053
Li, Xiaoyue; Zhang, Xiaoying; Jiang, Daqing
A new existence theory for positive periodic solutions to functional differential equations with impulse effects.
(English)
[J] Comput. Math. Appl. 51, No. 12, 1761-1772 (2006). ISSN 0898-1221

The authors study the existence of positive periodic solutions for the nonautonomous functional differential equation $$\dot{y}(t)=-a(t) y(t)+g(t,y(t-\tau(t))), t \neq t_j, j \in \mathbb{Z}, y(t_j^+)=y(t_j^-)+I_j(y(t_j)), \tag1$$ where $a \in C(\mathbb{R},(0,\infty))$, $\tau \in C(\mathbb{R},\mathbb{R})$, $g \in C(\mathbb{R}\times [0,\infty),[0,\infty))$, $I_j \in C([0,\infty),[0,\infty))$, $a(t)$, $\tau(t)$, $g(t,y)$ are $w$-periodic functions, and $w>0$ is a constant. Here, $y(t_j^+)$, $y(t_j^-)=y(t_j)$ denote, respectively, the right and the left-hand side limits of $y$ at $t_j$, and the following hypotheses are assumed $t_{j+p}=t_j+w$, $I_{j+p}=I_j$, $j \in \mathbb{Z}$, for a certain positive integer $p$ in such a way that $[0,w)\cap \{t_j : j \in \mathbb{Z}\}=\{t_1,t_2,\dots,t_p\}$. The results included in this paper are connected with those given in the papers of {\it A. Wan, D. Jiang} and {\it X. Xu} [Comput. Math. Appl. 47, 1257--1262 (2004; Zbl 1073.34082)], and {\it A. Wan} and {\it D. Jiang} [Kyushu J. Math. 56, 193--202 (2002; Zbl 1012.34068)] for the nonimpulsive case. The new results extend those in [Comput. Math. Appl. 47, 1257--1262 (2004; Zbl 1073.34082)], and their proof is based on the application of fixed-point theorems in cones [see {\it K. Deimling}, Nonlinear Functional Analysis. Springer-Verlag, New York (1985; Zbl 0559.47040), and {\it K. Lan} and {\it J. R. L. Webb}, J. Differ. Equations 148, 407--421 (1998; Zbl 0909.34013)]. The calculus of the Green's function associated with problem (1) is also essential in their procedure. To this purpose, the authors consider an impulsive `linear' problem related to (1) which is written on its equivalent integral form. This expression is useful to write problem (1) as an integral equation. As a particular case of the main result, it is analyzed the case of sublinear and superlinear behavior. Finally, the authors include some examples which illustrate the applicability of the new results to some problems with biological meaning.
[Rosana Rodriguez López (Santiago de Compostela)]
MSC 2000:
*34K13 Periodic solutions of functional differential equations
34K45 Equations with impulses
47N20 Appl. of operator theory to differential and integral equations

Keywords: functional differential equation; impulse; positive periodic solution; fixed-point theorem; existence

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