TY  - BOOK
AU  - Lyche,Tom
AU  - Merrien,Jean-Louis
TI  - Exercises in Computational Mathematics with MATLAB
T2  - Problem Books in Mathematics,
SN  - 9783662435113
U1  - 518 23
PY  - 2014///
CY  - Berlin, Heidelberg
PB  - Springer Berlin Heidelberg, Imprint: Springer
KW  - Algebra
KW  - Applied mathematics
KW  - Approximation theory
KW  - Computer mathematics
KW  - Computer-aided engineering
KW  - Engineering mathematics
KW  - Matrix theory
KW  - Computational Mathematics and Numerical Analysis
KW  - Applications of Mathematics
KW  - Approximations and Expansions
KW  - Computer-Aided Engineering (CAD, CAE) and Design
KW  - Linear and Multilinear Algebras, Matrix Theory
KW  - Mathematical and Computational Engineering
N1  - 1 An Introduction to MATLAB commands -- 2 Matrices and Linear Systems -- 3 Matrices, Eigenvalues and Eigenvectors -- 4 Matrices, Norms and Conditioning -- 5 Iterative Methods -- 6 Polynomial Interpolation -- 7 Bézier Curves and Bernstein Polynomials -- 8 Piecewise Polynomials, Interpolation and Applications -- 9 Approximation of Integrals -- 10 Linear Least Squares Methods -- 11 Continuous and Discrete Approximations -- 12 Ordinary Differential Equations, One Step Methods -- 13 Finite Differences for differential and partial differential equations -- References -- Index of Names -- Subject Index -- MATLAB Index
N2  - Designed to provide tools for independent study, this book contains student-tested mathematical exercises joined with MATLAB programming exercises.   Most chapters open with a review followed by theoretical and programming exercises, with detailed solutions provided for all problems including programs. Many of the MATLAB exercises are presented as Russian dolls: each question improves and completes the previous program and results are provided to validate the intermediate programs.   The book offers useful MATLAB commands, advice on tables, vectors, matrices and basic commands for plotting. It contains material on eigenvalues and eigenvectors and  important norms of vectors and matrices including perturbation theory; iterative methods for solving nonlinear and linear equations; polynomial and piecewise polynomial interpolation; Bézier curves; approximations of  functions and integrals and more. The last two chapters considers ordinary differential equations including two point boundary value problems, and deal with finite difference methods for some partial differential equations.   The format is designed to assist students working alone, with concise Review paragraphs, Math Hint footnotes on the mathematical aspects of a problem and MATLAB Hint footnotes with tips on programming
ER  -