
Combining theoretical insights with practical applications, this stimulating collection provides a state-of-the-art survey of the finite element method, one of the most powerful tools available for the solution of physical problems. Written by leading experts, this volume consider such topics as parabolic Galerkin methods, nonconforming elements, the treatment of singularities in elliptic boundary value problems, and conforming methods for self-adjount elliptic problems. This will be an invaluable basic reference for computational mathematicians and engineers who use finite element methods in academic or industrial research.
This volume investigates the mathematical foundations and practical utility of finite element methods in solving complex partial differential equations. Edited by David F. Griffiths, the text compiles contributions from leading experts to bridge the gap between theoretical numerical analysis and applied engineering. It provides a rigorous framework for understanding how these computational tools function across various physical problem domains.
What You Will Find
Experts recognize this collection as a foundational reference for computational mathematicians and engineers engaged in advanced research. Readers frequently note the technical density of the prose, which is tailored specifically for those with a strong background in numerical analysis and differential equations.
Page Count:
250
Publication Date:
1985-05-23
Publisher:
Oxford University Press
ISBN-10:
0198536054
ISBN-13:
9780198536055
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