Description
Introduction to Computational Linear Algebra
Authors: Nassif Nabil, Erhel Jocelyne, Philippe Bernard
Language: EnglishSubject for Introduction to Computational Linear Algebra:
Keywords
P1 Finite Element; QR Method; Numerical Methods; Rayleigh Quotient Iteration; Numerical Solutions Of Ordinary Differential Equations; Level-2 BLAS; Blas Operations; QR Factorization; Krylov Methods; Gram Schmidt Process; Singular Value Decomposition; Krylov Subspace; Computer Programming; BLAS Operation; Numerical Solutions Of Partial Differential Equations; QR Decomposition; Numerical Linear Algebra; Symmetric Tridiagonal Matrix; Algorithms For Eigenvalue Problems; Householder Transformations; Matlab Programs; Orthonormal Basis; Gauss Transforms; LU Decomposition; Invariant Subspace; Full Column Rank; Ritz Values; GMRES Algorithm; Subspace Condition; Lax Milgram Theorem; Bi-Conjugate Gradient Method; Schur’s Decomposition; A12 A23 A34 A45a11 A22; Steepest Descent Method
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Teach Your Students Both the Mathematics of Numerical Methods and the Art of Computer Programming
Introduction to Computational Linear Algebra presents classroom-tested material on computational linear algebra and its application to numerical solutions of partial and ordinary differential equations. The book is designed for senior undergraduate students in mathematics and engineering as well as first-year graduate students in engineering and computational science.
The text first introduces BLAS operations of types 1, 2, and 3 adapted to a scientific computer environment, specifically MATLAB®. It next covers the basic mathematical tools needed in numerical linear algebra and discusses classical material on Gauss decompositions as well as LU and Cholesky?s factorizations of matrices. The text then shows how to solve linear least squares problems, provides a detailed numerical treatment of the algebraic eigenvalue problem, and discusses (indirect) iterative methods to solve a system of linear equations. The final chapter illustrates how to solve discretized sparse systems of linear equations. Each chapter ends with exercises and computer projects.
Basic Linear Algebra Subprograms: BLAS. Basic Concepts for Matrix Computations. Gauss Elimination and LU Decompositions of Matrices. Orthogonal Factorizations and Linear Least Squares Problems. Algorithms for the Eigenvalue Problem. Iterative Methods for Systems of Linear Equations. Sparse Systems to Solve Poisson Differential Equations. Bibliography. Index.
Nabil Nassif is affiliated with the Department of Mathematics at the American University of Beirut, where he teaches and conducts research in mathematical modeling, numerical analysis, and scientific computing. He earned a PhD in applied mathematics from Harvard University under the supervision of Professor Garrett Birkhoff.
Jocelyne Erhel is a senior research scientist and scientific leader of the Sage team at INRIA in Rennes, France. She earned a PhD from the University of Paris. Her research interests include sparse linear algebra and high performance scientific computing applied to geophysics, mainly groundwater models.
Bernard Philippe was a senior research scientist at INRIA in Rennes, France, until 2015 when he retired. He earned a PhD from the University of Rennes. His research interests include matrix computing with a special emphasis on large-sized eigenvalue problems.
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