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The generic behavior of solutions to some evolution equations: Asymptotics and Sobolev norms
Optimal regularity and stability analysis in the $\alpha$Norm for a class of partial functional differential equations with infinite delay
1.  Université Cadi Ayyad, Faculté des Sciences Semlalia, Département de Mathématiques, B.P.2390 Marrakech, Morocco 
2.  African Institute for Mathematical Sciences (AIMS), 6 Melrose Road, Muizenberg 7945, South Africa 
References:
[1] 
M. Adimy, A. Elazzouzi and K. Ezzinbi, Reduction principe and dynamic behaviors for a class of partial functional differential equations, Nonlinear Analysis, Theory, Methods and Applications, 71 (2009), 17091727. doi: 10.1016/j.na.2009.01.008. Google Scholar 
[2] 
R. Benkhalti and K. Ezzinbi, Existence and stability in the $\alpha$norm for some partial functinal differential equations with infinite delay, Differential and Integral Equations, 19 (2006), 545572. Google Scholar 
[3] 
O . Diekmann, S. A. Van Gils, S. M. Verduyn Lunel and H. O. walther, "Delay Equations, Functional, Complex and Nonlinear Analysis," 110, SpringerVerlag, New York, 1995. Google Scholar 
[4] 
K. J. Engel and R. Nagel, "OneParameter Semigroups of Linear Evolution Equations," 194, SpringerVerlag, Berlin, 2000. Google Scholar 
[5] 
K. Ezzinbi and A. Ouhinou, Necessary and sufficient conditions for the regularity and stability for some partial functional differential equations with infinite delay, Nonlienar Analysis, Theory, Methods and Applications, 64 (2006), 16901709. doi: 10.1016/j.na.2005.07.017. Google Scholar 
[6] 
K. Ezzinbi and A. Ouhinou, Stability and asymptotic behavior of solutions for some linear partial functional differential equations in critical cases, Nonlienar Analysis, Theory, Methods and Applications, 70 (2009), 40084020. doi: 10.1016/j.na.2008.08.010. Google Scholar 
[7] 
J. Hale and J. Kato, Phase space for retarded equations with unbounded delay, Funkcial Ekvac, 21 (1978), 1141. Google Scholar 
[8] 
Y. Hino, S. Murakami and T. Naito, "Functional Differential Equations with Infinite Delay," 1473, SpringerVerlag, Berlin, 1991. Google Scholar 
[9] 
T. Naito, J. S. Shin and S. Murakami, On solution semigroups of general functional differential equations, Nonlinear Analysis, 30 (1997), 45654576. doi: 10.1016/S0362546X(97)003155. Google Scholar 
[10] 
T. Naito, J. S. Shin and S. Murakami, On stability of solutions in linear autonomous functional differential equations, Funkcialaj Ekvacioj, 43 (2000), 323337. Google Scholar 
[11] 
T. Naito, J. S. Shin and S. Murakami, The generator of the solution semigroup for the general linear functional differential equation, Bull. Univ.ElectroCommunications, 11 (1998), 2938. Google Scholar 
[12] 
A. Pazy, "Semigroups of Linear Operators and Applications to Partial Differential Equations," 44, SpringerVerlag, New York, 1983. Google Scholar 
[13] 
C. C. Travis and G. F. Webb, Partial differential equations with deviating arguments in the time variable, Journal of Mathematical Analysis and Applications, 56 (1976), 397409. doi: 10.1016/0022247X(76)900524. Google Scholar 
[14] 
C. C. Travis and G. F. Webb, Existence, stability and compactness in the $\alpha$norm for partial functional differential equations, Transactions of the American Mathematical Society, 240 (1978), 129143. doi: 10.2307/1998809. Google Scholar 
[15] 
J. Wu, "Theory and Applications of Partial Functional Differential Equations," 119, SpringerVerlag, Berlin, 1996. Google Scholar 
show all references
References:
[1] 
M. Adimy, A. Elazzouzi and K. Ezzinbi, Reduction principe and dynamic behaviors for a class of partial functional differential equations, Nonlinear Analysis, Theory, Methods and Applications, 71 (2009), 17091727. doi: 10.1016/j.na.2009.01.008. Google Scholar 
[2] 
R. Benkhalti and K. Ezzinbi, Existence and stability in the $\alpha$norm for some partial functinal differential equations with infinite delay, Differential and Integral Equations, 19 (2006), 545572. Google Scholar 
[3] 
O . Diekmann, S. A. Van Gils, S. M. Verduyn Lunel and H. O. walther, "Delay Equations, Functional, Complex and Nonlinear Analysis," 110, SpringerVerlag, New York, 1995. Google Scholar 
[4] 
K. J. Engel and R. Nagel, "OneParameter Semigroups of Linear Evolution Equations," 194, SpringerVerlag, Berlin, 2000. Google Scholar 
[5] 
K. Ezzinbi and A. Ouhinou, Necessary and sufficient conditions for the regularity and stability for some partial functional differential equations with infinite delay, Nonlienar Analysis, Theory, Methods and Applications, 64 (2006), 16901709. doi: 10.1016/j.na.2005.07.017. Google Scholar 
[6] 
K. Ezzinbi and A. Ouhinou, Stability and asymptotic behavior of solutions for some linear partial functional differential equations in critical cases, Nonlienar Analysis, Theory, Methods and Applications, 70 (2009), 40084020. doi: 10.1016/j.na.2008.08.010. Google Scholar 
[7] 
J. Hale and J. Kato, Phase space for retarded equations with unbounded delay, Funkcial Ekvac, 21 (1978), 1141. Google Scholar 
[8] 
Y. Hino, S. Murakami and T. Naito, "Functional Differential Equations with Infinite Delay," 1473, SpringerVerlag, Berlin, 1991. Google Scholar 
[9] 
T. Naito, J. S. Shin and S. Murakami, On solution semigroups of general functional differential equations, Nonlinear Analysis, 30 (1997), 45654576. doi: 10.1016/S0362546X(97)003155. Google Scholar 
[10] 
T. Naito, J. S. Shin and S. Murakami, On stability of solutions in linear autonomous functional differential equations, Funkcialaj Ekvacioj, 43 (2000), 323337. Google Scholar 
[11] 
T. Naito, J. S. Shin and S. Murakami, The generator of the solution semigroup for the general linear functional differential equation, Bull. Univ.ElectroCommunications, 11 (1998), 2938. Google Scholar 
[12] 
A. Pazy, "Semigroups of Linear Operators and Applications to Partial Differential Equations," 44, SpringerVerlag, New York, 1983. Google Scholar 
[13] 
C. C. Travis and G. F. Webb, Partial differential equations with deviating arguments in the time variable, Journal of Mathematical Analysis and Applications, 56 (1976), 397409. doi: 10.1016/0022247X(76)900524. Google Scholar 
[14] 
C. C. Travis and G. F. Webb, Existence, stability and compactness in the $\alpha$norm for partial functional differential equations, Transactions of the American Mathematical Society, 240 (1978), 129143. doi: 10.2307/1998809. Google Scholar 
[15] 
J. Wu, "Theory and Applications of Partial Functional Differential Equations," 119, SpringerVerlag, Berlin, 1996. Google Scholar 
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