时间尺度上动态方程的统一Massera型定理

IF 0.8 4区数学 Q2 MATHEMATICS

Filomat Pub Date : 2023-01-01 DOI:10.2298/fil2308405k

H. Koyuncuoğlu

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引用次数: 0

摘要

本文利用广义周期概念(T， ?)-周期，在时间尺度上得到线性和非线性动力学方程的Massera型定理。为了实现这一任务，我们首先定义了一个新的有界性概念，即-有界性，然后我们在线性和非线性情况下建立了-有界解的存在性与(T， ?)-周期解之间的联系。在我们的分析中，我们假设时间尺度T的移位是周期性的??它不需要是平移不变量。因此，这项工作的结果对于不限于T = R或T = Z的大类时域是有效的。

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Unified Massera type theorems for dynamic equations on time scales

In this paper, we aim to obtain Massera type theorems for both linear and nonlinear dynamic equations by using a generalized periodicity notion, namely (T, ?)-periodicity, on time scales. To achieve this task, first we define a new boundedness concept so-called ?-boundedness, and then we establish a linkage between the existence of ?-bounded solutions and (T, ?)-periodic solutions of dynamic equations in both linear and nonlinear cases. In our analysis, we assume that the time scale T is periodic in shifts ?? which does not need to be translation invariant. Thus, outcomes of this work are valid for a large class of time-domains not restricted to T = R or T = Z.

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