In this paper we shall consider the following nonlinear impulsive delay differential equation
x';(t) + alphaV(t)x(t)x(n)(t - momega)/0(n) + x(n)(t - momega) = lambda(t), a.e. t > 0, t not equal t(k),
x(t(k)(+)) = 1/(1+b(k))x(tk), k = 1,2,...,
where m and n are positive integers, V(t) and lambda(t) are positive periodic continuous functions with period omega > 0. In the nondelay case (m = 0), we show that the above equation has a unique positive periodic solution x*(t) which is globally asymptotically stable. In the delay case, we present sufficient conditions for the global attractivity of x*(r). Our results imply that under the appropriate periodic impulsive perturbations, the impulsive delay equation shown above preserves the original periodic property of the nonimpulsive delay equation. In particular, our work extends and improves some known results.

• 出版日期2005-2-15
• 单位兰州大学; 兰州理工大学