Acta mathematica scientia,Series A ›› 2024, Vol. 44 ›› Issue (2): 361-375.

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Almost Automorphy for a Class of Delay Differential Equations with Non-densely Defined Operators on Banach Spaces

Zheng Lanling(),Ding Huisheng*()   

  1. School of Mathematics and Statistics, Jiangxi Normal University, Nanchang 330022
  • Received:2023-07-24 Revised:2024-01-25 Online:2024-04-26 Published:2024-04-07
  • Supported by:
    NSFC(12361023);Two Thousand Talents Program of Jiangxi Province(jxsq2019201001);Graduate Innovation Fund of Jiangxi Normal University(YJS2022058)

Abstract:

This paper is mainly concerned with almost automorphy for a class of finite delay differential equations $ u'(t)=Au(t)+Lu_t+f(t,u_t),\ t\in \mathbb {R} $ on a Banach space $ X $, where $ A $ is a Hille-Yosida operator with the domain being not dense, $ L $ is a bounded linear operator, and $ f $ is a binary $ S^p$-almost automorphic function. Compared with the previous research results, we do not require the semigroup generated by the Hille-Yosida operator to be compact, and only under weaker Lipschitz hypothesis of $ f $ and $ S^p$-almost automorphy hypothesis, which is weaker than almost automorphy, of $ f $, the solution of the above delay differential equation is showed to be compact almost automorphic (stronger than almost automorphic). Moreover, the abstract results are applied to a class of partial differential equations arising in age-structured models.

Key words: Hille-Yosida operator, Almost automorphy, Almost periodicity, Abstract delay differential equation

CLC Number: 

  • O177.92
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