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Almost automorphic solutions for semilinear boundary differential equations |
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| Authors: | S. Boulite L. Maniar G. M. N'Gué ré kata | ||||
| Affiliation: | Department of Mathematics, Faculty of Sciences Semlalia, B.P. 2390, Marrakesh, Morocco ; Department of Mathematics, Faculty of Sciences Semlalia, B.P. 2390, Marrakesh, Morocco ; Department of Mathematics, Morgan State University, 1700 E. Cold Spring Lane, Baltimore, Maryland 21251 | ||||
| Abstract: | In this work, we use the extrapolation methods to study the existence and uniqueness of almost automorphic solutions to the semilinear boundary differential equation
where  generates a hyperbolic  -semigroup on a Banach space  and  are almost automorphic functions which take values in  and a ``boundary space'  , respectively. These equations are an abstract formulation of partial differential equations with semilinear terms at the boundary, such as population equations, retarded differential equations and boundary control systems. An application to retarded differential equations is given. |
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| Keywords: | Almost automorphic functions semilinear boundary differential equations retarded differential equations hyperbolic semigroups extrapolation space Dirichlet map | ||||
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