Advanced search
Publication Cover
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
Submit an article Journal homepage
161
Views
4
CrossRef citations to date
0
Altmetric
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

References

  • Bohr H . Zur theorie der fastperiodischen funktionen. Acta Math. 1925;46(1–2):101–214.
  • Bochner S . Abstrakte fastperiodische funktionen. Acta Math. 1933;61(1):149–184.
  • Favard J . Sur les équations différentielles linéaires à coefficients presque-périodiques. Acta Math. 1928;51(1):31–81.
  • Fink A . Almost periodic differential equations. Vol. 377, Lecture notes in mathematics. Berlin: Springer-Verlag; 1974.
  • Amerio L , Prouse G . Almost-periodic functions and functional equations. New York: Van Nostrand Reinhold; 1971.
  • Biroli M , Haraux A . Asymptotic behavior for an almost periodic, strongly dissipative wave equation. J Differ Equ. 1980;38(3):422–440.
  • Cieutat P . Almost periodic solutions of forced vectorial Liénard equations. J Differ Equ. 2005;209(2):302–328.
  • Cieutat P , Ezzinbi K . Almost automorphic solutions for some evolution equations through the minimizing for some subvariant functional, applications to heat and wave equations with nonlinearities. J Funct Anal. 2011;260(9):2598–2634.
  • Dafermo CM . Almost periodic processes and almost periodic solutions of evolution equations. Proceedings of International Symposium on Dynamical Systems, University of Florida, Gainesville; 1976. New York: Academic; 1977. p. 43–57.
  • Haraux A . Asymptotic behavior for two-dimensional, quasi-autonomous, almost-periodic evolution equations. J Differ Equ. 1987;66(1):62–70.
  • Ishii H . On the existence of almost periodic complete trajectories for contractive almost periodic processes. J Differ Equ. 1982;43(1):66–72.
  • Corduneanu C . Almost periodic oscillations and waves. Springer Science & Business Media; 2009.
  • Levitan BM , Zhikov VV . Almost periodic functions and differential equations. Cambridge University Press; 1982.
  • Zaidman S . Topics in abstract differential equations. Vol. 304. Harlow: Longman Scientific & Technical; 1994.
  • Johnson RA . A linear, almost periodic equation with an almost automorphic solution. Proc Amer Math Soc. 1981;82(2):199–205.
  • Ortega R , Tarallo M . Almost periodic linear differential equations with non-separated solutions. J Funct Anal. 2006;237(2):402–426.
  • Shen W , Yi Y . Almost automorphic and almost periodic dynamics in skew-product semiflows. Memoirs Amer Math Soc. 1998;136(651):647–647.
  • Bochner S . Continuous mappings of almost automorphic and almost periodic functions. Proc Nat Acad Sci USA. 1964;52(4):907–910.
  • Veech WA . Almost automorphic functions on groups. Amer J Math. 1965;87(3):719–751.
  • Zaki M . Almost automorphic integrals of almost automorphic functions. Can Math Bull. 1972;15:433–436.
  • N’Guérékata GM . Sur les solutions presqu’automorphes d’équations différentielles abstraites. Ann Sci Math Québec. 1981;5(1):69–79.
  • Diagana T , N’Guérékata GM , Van Minh N . Almost automorphic solutions of evolution equations. Proc Amer Math Soc. 2004;132(11):3289–3298.
  • Ezzinbi K , Fatajou S , N’Guérékata GM . Massera-type theorem for the existence of C (n)-almost-periodic solutions for partial functional differential equations with infinite delay. Nonlinear Anal Theory Methods Appl. 2008;69(4):1413–1424.
  • Ezzinbi K , N’Guérékata GM . Massera type theorem for almost automorphic solutions of functional differential equations of neutral type. J Math Anal Appl. 2006;316(2):707–721.
  • Goldstein JA , N’Guérékata GM . Almost automorphic solutions of semilinear evolution equations. Proc Amer Math Soc. 2005;133(8):2401–2408.
  • Hino Y , Murakami S . Almost automorphic solutions for abstract functional differential equations. J Math Anal Appl. 2003;286(2):741–752.
  • Liu J , N’Guérékata G , Van Minh N . A Massera type theorem for almost automorphic solutions of differential equations. J Math Anal Appl. 2004;299(2):587–599.
  • N’Guérékata GM . Existence and uniqueness of almost automorphic mild solutions to some semilinear abstract differential equations. Semigroup Forum. 2004;69(1):80–86.
  • N’Guérékata GM , Pankov A . Stepanov-like almost automorphic functions and monotone evolution equations. Nonlinear Anal Theory Methods Appl. 2008;68(9):2658–2667.
  • Diagana T . Almost automorphic type and almost periodic type functions in abstract spaces. Springer; 2013.
  • N’Guérékata GM . Almost automorphic and almost periodic functions in abstract spaces. Springer; 2001.
  • Hale JK , Kato J . Phase space for retarded equations with infinite delay. Funkc Ekvacioj. 1978;21(1):11–41.
  • Massera JL . The existence of periodic solutions of systems of differential equations. Duke Math J. 1950;17(4):457–475.
  • Cooke R . Almost periodicity of bounded and compact solutions of differential equations. Duke Math J. 1969;36:273–276.
  • Corduneanu C , Goldstein J . Almost periodicity of bounded solutions to nonlinear abstract equations. North-Holland Math Stud. 1984;92:115–121.
  • N’Guérékata GM . An extension of the Bohr-Neugebauer theorem. Dyn Syst Appl. 2001;10(3):451–453.
  • Rao AS . On differential operators with Bohr-Neugebauer type property. J Differ Equ. 1973;13(3):490–494.
  • Zaidman S . Remarks on differential equations with Bohr-Neugebauer property. J Math Anal Appl. 1972;38(1):167–173.
  • Corduneanu C . Almost periodic functions. New York: Chelsea Publishing Company; 1989.
  • Zaidman S . Bohr-Neugebauer theorem for operators of finite rank in Hilbert spaces. Not Amer Math Soc. 1974;21(7):A594–A594.
  • Goldstein JA . Convexity, boundedness, and almost periodicity for differential equations in Hillbert space. Int J Math Math Sci. 1979;2(1):1–13.
  • Hino Y , Naito T , Murakami S . Functional differential equations with infinite delay. Springer; 1991.
  • Adimy M , Ezzinbi K , Ouhinou A . Behavior near hyperbolic stationary solutions for partial functional differential equations with infinite delay. Nonlinear Anal Theory Methods Appl. 2008;68(8):2280–2302.
  • Thieme HR . Semiflows generated by Lipschitz perturbations of non-densely defined operators. Differ Integral Equ. 1990;3(6):1035–1066.
  • Benkhalti R , Bouzahir H , Ezzinbi K . Existence of a periodic solution for some partial functional differential equations with infinite delay. J Math Anal Appl. 2001;256(1):257–280.
  • Adimy M , Bouzahir H , Ezzinbi K . Local existence and stability for some partial functional differential equations with infinite delay. Nonlinear Anal Theory Methods Appl. 2002;48(3):323–348.
  • Engel KJ , Nagel R . One-parameter semigroups for linear evolution equations. Vol. 194. Springer Science & Business Media; 2000.
  • Adimy M , Ezzinbi K , Ouhinou A . Variation of constants formula and almost periodic solutions for some partial functional differential equations with infinite delay. J Math Anal Appl. 2006;317(2):668–689.
  • Bochner S . A new approach to almost periodicity. Proc Nat Acad Sci USA. 1962;48(12):2039–2043.
  • Zaidman S . Almost-periodic functions in abstract spaces. Vol. 126. Pitman Advanced Publishing Program; 1985.
  • Basit B , Günzler H . Spectral criteria for solutions of evolution equations and comments on reduced spectra. arXiv:1006.2169. 2010.
  • Pankov AA . Bounded and almost periodic solutions of nonlinear operator differential equations. Springer; 1990.
  • Aubin JP . Applied functional analysis. Wiley; 2011.
  • Murakami S , Naito T . Fading memory spaces and stability properties for functional differential equations with infinite delay. Funkc Ekvacioj. 1989;32:91–105.
  • N’Guérékata GM . Topics in almost automorphy. Springer Science & Business Media; 2007.
  • Benkhalti R , Es-sebbar B , Ezzinbi K . On a Bohr-Neugebauer property for some almost automorphic abstract delay equations. J Integral Equ Appl. Forthcoming. (accepted 2017).
  • N’Guérékata GM . Comments on almost automorphic and almost periodic functions in Banach spaces. Far East J Math Sci. 2005;17(3):337–344.
  • Es-sebbar B , Ezzinbi K . Stepanov ergodic perturbations for some neutral partial functional differential equations. Math Methods Appl Sci. 2016;39(8):1945–1963.
  • Tarallo M . A Stepanov version for Favard theory. Arch Math. 2008;90(1):53–59.
  • Corduneanu C . Principles of differential and integral equations. American Mathematical Society; 2008.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.