
Nonlinear elliptic problems play an increasingly important role in mathematics, science and engineering, creating an exciting interplay between the subjects. This is the first and only book to prove in a systematic and unifying way, stability, convergence and computing results for the different numerical methods for nonlinear elliptic problems. The proofs use linearization, compact perturbation of the coercive principal parts, or monotone operator techniques, and approximation theory. Examples are given for linear to fully nonlinear problems (highest derivatives occur nonlinearly) and for the most important space discretization methods: conforming and nonconforming finite element, discontinuous Galerkin, finite difference, wavelet (and, in a volume to follow, spectral and meshfree) methods. A number of specific long open problems are solved here: numerical methods for fully nonlinear elliptic problems, wavelet and meshfree methods for nonlinear problems, and more general nonlinear boundary conditions. We apply it to all these problems and methods, in particular to eigenvalues, monotone operators, quadrature approximations, and Newton methods. Adaptivity is discussed for finite element and wavelet methods. The book has been written for graduate students and scientists who want to study and to numerically analyze nonlinear elliptic differential equations in Mathematics, Science and Engineering. It can be used as material for graduate courses or advanced seminars.
This text investigates the stability, convergence, and computational efficacy of numerical methods applied to nonlinear elliptic differential equations. Klaus Boehmer, a specialist in numerical mathematics, synthesizes complex analytical techniques to provide a unified framework for solving these problems. By utilizing linearization, monotone operator theory, and approximation theory, the author establishes a rigorous foundation for analyzing both linear and fully nonlinear elliptic systems.
What You Will Find
Scope Limits
Experts recognize this work as a foundational reference for researchers and graduate students focusing on the numerical analysis of nonlinear elliptic equations. Readers frequently note the high academic density of the prose, which serves as a rigorous resource for advanced seminars and independent scientific inquiry.
Page Count:
720
Publication Date:
2010-01-01
Publisher:
OUP Oxford
ISBN-10:
0191574473
ISBN-13:
9780191574474
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