This book presents an approximation theory for a general class of nonlinear evolution equations in Banach spaces and the semigroup theory, including the linear (Hille-Yosida), nonlinear (Crandall-Liggett) and time-dependent (Crandall-Pazy) theorems.The implicit finite difference method of Euler is shown to generate a sequence convergent to the unique integral solution of evolution equations of the maximal monotone type. Moreover, the Chernoff theory provides a sufficient condition for consistent and stable time integration of time-dependent nonlinear equations. The Trotter-Kato theorem and the Lie-Trotter type product formula give a mathematical framework for the convergence analysis of numerical approximations of solutions to a general class of partial differential equations. This book contains examples demonstrating the applicability of the generation as well as the approximation theory.In addition, the Kobayashi-Oharu approach of locally quasi-dissipative operators is discussed for homogeneous as well as nonhomogeneous equations. Applications to the delay differential equations, Navier-Stokes equation and scalar conservation equation are given.
| ISBN-13: | 9789812380265 |
| ISBN-10: | 9812380264 |
| Publisher: | World Scientific |
| Publication date: | 2002 |
| Pages: | 498 |
| Product dimensions: | Height: 8.5 Inches, Length: 6.25 Inches, Weight: 1.92 Pounds, Width: 1.25 Inches |
| Author: | Kazufumi Ito, F. Kappel |
| Language: | en |
| Binding: | Hardcover |
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