Co-Semigroups and Applications

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The book contains a unitary and systematic presentation of both classical and very recent parts of a fundamental branch of functional analysis: linear semigroup theory with main emphasis on examples and applications. There are several specialized, but quite interesting, topics which didn't find their place into a monograph till now, mainly because they are very new. So, the book, although containing the main parts of the classical theory of Co-semigroups, as the Hille-Yosida theory, includes also several very new results, as for instance those referring to various classes of semigroups such as equicontinuous, compact, differentiable, or analytic, as well as to some nonstandard types of partial differential equations, i.e. elliptic and parabolic systems with dynamic boundary conditions, and linear or semilinear differential equations with distributed (time, spatial) measures. Moreover, some finite-dimensional-like methods for certain semilinear pseudo-parabolic, or hyperbolic equations are also disscussed. Among the most interesting applications covered are not only the standard ones concerning the Laplace equation subject to either Dirichlet, or Neumann boundary conditions, or the Wave, or Klein-Gordon equations, but also those referring to the Maxwell equations, the equations of Linear Thermoelasticity, the equations of Linear Viscoelasticity, to list only a few. Moreover, each chapter contains a set of various problems, all of them completely solved and explained in a special section at the end of the book. The book is primarily addressed to graduate students and researchers in the field, but it would be of interest for both physicists and engineers. It should be emphasised that it is almost self-contained, requiring only a basic course in Functional Analysis and Partial Differential Equations.

Author(s): Ioan I. Vrabie (Eds.)
Series: North-Holland Mathematics Studies 191
Edition: 1
Publisher: JAI Press
Year: 2003

Language: English
Pages: 1-373

Content:
Preface
Pages xi-xii
Ioan I. Vrabie

Chapter 1 Preliminaries Original Research Article
Pages 1-34

Chapter 2 Semigroups of linear operators Original Research Article
Pages 35-50

Chapter 3 Generation theorems Original Research Article
Pages 51-76

Chapter 4 Differential operators generating C0-semigroups Original Research Article
Pages 77-104

Chapter 5 Approximation problems and applications Original Research Article
Pages 105-128

Chapter 6 Some special classes of C0-semigroups Original Research Article
Pages 129-150

Chapter 7 Analytic semigroups Original Research Article
Pages 151-182

Chapter 8 The nonhomogeneous Cauchy problem Original Research Article
Pages 183-204

Chapter 9 Linear evolution problems with measures as data Original Research Article
Pages 205-226

Chapter 10 Some nonlinear cauchy problems Original Research Article
Pages 227-248

Chapter 11 The cauchy problem for semilinear equations Original Research Article
Pages 249-268

Chapter 12 Semilinear equations involving measures Original Research Article
Pages 269-290

Appendix a Compactness results Original Research Article
Pages 291-318

Solutions Chapter 1
Pages 319-360

Bibliography Review Article
Pages 361-367

List of symbols
Pages 368-370

Subject index
Pages 371-373