| Management number | 231717681 | Release Date | 2026/06/18 | List Price | US$30.22 | Model Number | 231717681 | ||
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This book develops the theory of global attractors for a class of parabolic PDEs that includes reaction-diffusion equations and the Navier-Stokes equations, two examples that are treated in detail. A lengthy chapter on Sobolev spaces provides the framework that allows a rigorous treatment of existence and uniqueness of solutions for both linear time-independent problems (Poisson's equation) and the nonlinear evolution equations which generate the infinite-dimensional dynamical systemss of the title. Attention then switches to the global attractor, a finite-dimensional subset of the infinite-dimensional phase space which determines the asymptotic dynamics. In particular, the concluding chapters investigate in what sense the dynamics restricted to the attractor are themselves "finite-dimensional." The book is intended as a didactic text for first year graduates, and assumes only a basic knowledge of Banach and Hilbert spaces, and a working understanding of the Lebesgue integral. Read more
| ISBN10 | 0521635640 |
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| ISBN13 | 978-0521635646 |
| Edition | 1st |
| Language | English |
| Publisher | Cambridge University Press |
| Dimensions | 6 x 1.2 x 9 inches |
| Item Weight | 1.54 pounds |
| Print length | 480 pages |
| Part of series | Cambridge Texts in Applied Mathematics |
| Publication date | August 2, 2010 |
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