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Existence of Periodic Solutions for a Class of Fourth-order Difference Equation
  • Xiaoling Han,
  • fumei ye
Xiaoling Han
Northwest Normal University

Corresponding Author:hanxiaoling9@163.com

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fumei ye
Northwest Normal University
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Abstract

We apply the continuation theorem of Mawhin to ensure that a fourth-order nonlinear difference equation of the form $$\Delta^4 u(k-2) -a(k)u^{\alpha}(k)+b(k)u^{\beta}(k)=0,$$ with periodic boundary conditions possesses at least one nontrivial positive solution, where $\Delta u(k)=u(k+1)-u(k)$ is the forward difference operator, $\alpha,\beta\in\mathbb{N}^+$ and $\alpha\neq\beta$. $a(k),b(k)$ are $T$-periodic functions and $a(k)b(k)>0$. As applications, we will give some examples to illustrate the application of these theorems.