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Applicable Analysis
An International Journal
Volume 98, 2019 - Issue 1-2: Homogenization and Qualitative Theory of Differential Equations dedicated to the memory of Vassily Vassilievich Zhikov
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Articles

Bohr-Neugebauer property for almost automorphic partial functional differential equations

Brahim Es-sebbarFaculté des Sciences Semlalia, Département de Mathématiques, Université Cadi Ayyad, Marrakesh, Morocco.CorrespondenceGaston.N’[email protected]
,
Khalil EzzinbiFaculté des Sciences Semlalia, Département de Mathématiques, Université Cadi Ayyad, Marrakesh, Morocco.
&
Gaston M. N’GuérékataDepartment of Mathematics, Morgan State University, Baltimore, MD, USA.
Pages 381-407 | Received 13 Mar 2017, Accepted 10 Sep 2017, Published online: 08 Oct 2017
 
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ABSTRACT

We prove that a partial functional differential equation with infinite delay has the Bohr–Neugebauer property, when the semigroup generated by the differential operator is immediately compact and when the phase space has the uniform fading memory property. To illustrate our main result, we propose an application to a reaction–diffusion equation with continuous delay.

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Notes

No potential conflict of interest was reported by the authors.

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