Asymptotic behavior of evolution systems in arbitrary Banach spaces using general almost periodic splittings

We present sufficient conditions on the existence of solutions, with various specific almost periodicity properties, in the context of nonlinear, generally multivalued, non-autonomous initial value differential equations, and their whole line analogues, , , with a family of ω-dissipative operators i...

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Bibliographic Details
Published in:Advances in nonlinear analysis Vol. 8; no. 1; pp. 1 - 28
Main Author: Kreulich, Josef
Format: Journal Article
Language:English
Published: De Gruyter 01.01.2019
Subjects:
335B40
37L05
47J35
almost periodicity
Evolution equations
limiting equation
ISSN:2191-9496, 2191-950X
Online Access:Get full text
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Summary:We present sufficient conditions on the existence of solutions, with various specific almost periodicity properties, in the context of nonlinear, generally multivalued, non-autonomous initial value differential equations, and their whole line analogues, , , with a family of ω-dissipative operators in a general Banach space . According to the classical DeLeeuw–Glicksberg theory, functions of various generalized almost periodic types uniquely decompose in a “dominating” and a “damping” part. The second main object of the study – in the above context – is to determine the corresponding “dominating” part of the operators , and the corresponding “dominating” differential equation,
ISSN:2191-9496
2191-950X
DOI:10.1515/anona-2016-0075