an:05292997
Zbl 1158.34002
Liu, James H.; N'Gu??r??kata, Gaston M.; Minh, Nguyen Van
Topics on stability and periodicity in abstract differential equations
EN
Series on Concrete and Applicable Mathematics 6. Hackensack, NJ: World Scientific (ISBN 978-981-281-823-2/hbk). ix, 208~p. (2008).
00450634
2008
b
34-02 34G20 34C25 34C27 34G10
abstract differential equations; periodic solutions; almost periodic solutions; automorphic solutions
The authors have collected under a single cover a number of recent results on asymptotic behavior of solutions to evolution equations in Banach spaces. Fundamental definitions and theorems regarding Banach spaces, linear operators, semigroups of operators and spectral theory of operators are reviewed in Chapter 1. Chapter 2 is concerned with the stability and exponential dichotomy of linear homogeneous equations in Banach spaces. Existence of almost periodic solutions is addressed in Chapter 3, whereas existence of almost automorphic solutions to some classes of linear and semilinear abstract differential equations is discussed in Chapter 4. Chapter 5 deals with the existence of periodic solutions to nonlinear abstract differential equations and equations with finite and infinite delay. In addition to the review of results from functional analysis in Chapter 1, one finds additional information on Lipschitz operators, fixed point theorems, invariant subspaces and semilinear evolution equations in four appendices. Each chapter concludes with bibliographic comments and suggestions for further reading, and a number of exercises are inserted in the text.
Some criticism: The reader has to be patient. Since most results have been extracted from a number of different research papers, the notation is not always consistent (for instance, Banach space may be denoted as \(X\), \(\mathbf X\), or \(\mathbb X\)), some facts are repeated in different sections, and the clarity and manner of exposition vary from chapter to chapter. The format for references is a bit unusual, say (p. 44 in [Pazy (90)]) rather than traditional Pazy [90, p. 44]. The index is not very helpful, and it would be more convenient for the reader if the authors referred to theorems using their numbering and not by the names. Nevertheless, the selection of results included in the book reflects many important recent trends in the theory of abstract differential equations. Therefore, the monograph will be useful for graduate students and researchers working on asymptotic behavior of solutions to abstract differential equations.
Svitlana P. Rogovchenko (Kalmar)