Title of article
Criterions for detecting the existence of the exponential dichotomies in the asymptotic behavior of the solutions of variational equations
Author/Authors
C. Preda، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
29
From page
729
To page
757
Abstract
We prove that the admissibility of any pair of vector-valued Schäffer function spaces (satisfying a very
general technical condition) implies the existence of a “no past” exponential dichotomy for an exponentially
bounded, strongly continuous cocycle (over a semiflow). Roughly speaking the class of Schäffer function
spaces consists in all function spaces which are invariant under the right-shift and therefore our approach
addresses most of the possible pairs of admissible spaces. Complete characterizations for the exponential
dichotomy of cocycles are also obtained. Moreover, we involve a concept of a “no past” exponential dichotomy
for cocycles weaker than the classical concept defined by Sacker and Sell (1994) in [23]. Our
definition of exponential dichotomy follows partially the definition given by Chow and Leiva (1996) in [4]
in the sense that we allow the unstable subspace to have infinite dimension. The main difference is that
we do not assume a priori that the cocycle is invertible on the unstable space (actually we do not even
assume that the unstable space is invariant under the cocycle). Thus we generalize some known results due
to O. Perron (1930) [14], J. Daleckij and M. Krein (1974) [7], J.L. Massera and J.J. Schäffer (1966) [11],
N. van Minh, F. Räbiger and R. Schnaubelt (1998) [26].
© 2009 Elsevier Inc. All rights reserved.
Keywords
Exponentially bounded , exponential dichotomy , strongly continuous cocycles (over (semi)flows) , (Nonlinear) (semi)flows
Journal title
Journal of Functional Analysis
Serial Year
2010
Journal title
Journal of Functional Analysis
Record number
840093
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