Hilbert 空间二阶弱阻尼发展方程的周期解

数学物理学报 ›› 2026, Vol. 46 ›› Issue (1): 69-79.

Hilbert 空间二阶弱阻尼发展方程的周期解

李永祥^*(), 高芸()

西北师范大学数学与统计学院兰州 730070

收稿日期:2025-01-20 修回日期:2025-04-07 出版日期:2026-02-26 发布日期:2026-01-19
通讯作者: 李永祥 E-mail:liyx@nwnu.edu.cn;1745818220@qq.com
作者简介:高芸, Email: 1745818220@qq.com
基金资助:
国家自然科学基金(12061062);国家自然科学基金(12161080)

Periodic Solutions of Second-Order Evolution Equations with Weak Damping in Hilbert Spaces

Yongxiang Li^*(), Yun Gao()

College of Mathematics and Statistics, Northwest Normal University, Lanzhou 730070

Received:2025-01-20 Revised:2025-04-07 Online:2026-02-26 Published:2026-01-19
Contact: Yongxiang Li E-mail:liyx@nwnu.edu.cn;1745818220@qq.com
Supported by:
NSFC(12061062);NSFC(12161080)

摘要/Abstract

摘要：

该文讨论 Hilbert 空间 $ H $ 中二阶弱阻尼发展方程

$$ u''(t)+2c u'(t)+Au(t)=f(t, u(t)),\quad t\in \mathbb{R}, $$

周期解的存在性与唯一性, 其中 $ A:D(A)\subset H\to H $ 为正定自伴算子, 有紧预解式, $ f: \mathbb{R}\times H\to H$ 连续, $ f(t, x)$ 关于 $ t $ 以 $\omega$ 为周期, $c>0$ 为阻尼系数. 作者应用算子半群理论与不动点定理获得了方程 $\omega$-周期弱解和古典解的存在性和唯一性结果.

关键词: 二阶弱阻尼发展方程, 周期解, 弱解, 算子半群, 存在性和唯一性

Abstract:

In this paper, the existence and uniqueness of periodic solutions for the second-order evolution equation with weak damping in a Hilbert space $H$

$$ u''(t)+2c u'(t)+Au(t)=f(t, u(t)),\quad t\in \mathbb{R} $$

are discussed, where $ A: D(A)\subset H\to H$ is a positive definite self-adjoint operator with a compact resolvent in $H$, $f: \mathbb{R}\times H\to H$ is continuous, $f(t, x)$ is $\omega$-periodic in $t$, and $c>0$ is the damping coefficient. By applying the semigroup theory of linear operators and fixed-point theorem, we obtain existence and uniqueness results of $\omega$-periodic weak solution

and classical solution of the equations.

Key words: second-order evolution equations with weak damping, periodic solution, weak solution, semigroup of linear operators, existence and uniqueness

中图分类号:

O175.8

李永祥, 高芸. Hilbert 空间二阶弱阻尼发展方程的周期解[J]. 数学物理学报, 2026, 46(1): 69-79.

Yongxiang Li, Yun Gao. Periodic Solutions of Second-Order Evolution Equations with Weak Damping in Hilbert Spaces[J]. Acta mathematica scientia,Series A, 2026, 46(1): 69-79.

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