The algebraic eigenvalue problem by J. H. Wilkinson
- The algebraic eigenvalue problem
- J. H. Wilkinson
- Page: 683
- Format: pdf, ePub, mobi, fb2
- ISBN: 9780198534181
- Publisher: Oxford University Press, USA
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An iterative method to solve the algebraic eigenvalue problem An iterative method based on perturbation theory in matrix form is described as a procedure to obtain the eigenvalues and eigenvectors of square matrices. A note on the homotopy method for linear algebraic eigenvalue sparse linear algebraic eigenvalue problems on SIMD machines. This note offers a simpler proof than Li and Sauer's of the existence of homotopy curves for QD algorithms and algebraic eigenvalue problems A sketch of the standard QD algorithm is followed by the derivation of two similar algorithms for the calculation of all the eigenvalues of the matrix A from th. The Algebraic Eigenvalue Problem. By JH WILKINSON - Jstor of Engineering Sciences, The Technological Institute, Northwestern. University, Evanston, Illinois. The Algebraic Eigenvalue Problem. By J. H. WILKINSON. Templates for the Solution of Algebraic Eigenvalue Problems: A Large-scale problems of engineering and scientific computing often require solutions of eigenvalue and related problems. This book gives a unified overview of Wilkinson J.H. The algebraic eigenvalue problem (OUP, 1984)(KA Wilkinson J.H. The algebraic eigenvalue problem (OUP, 1984)(KA)(T)(683s) _MNl_.djvu шилкинсон й.х. тхе алгебраиц еигенвалуе проблем Chapter 11. Eigensystems 11.0 Introduction Wilkinson, J.H. 1965, The Algebraic Eigenvalue Problem (New York: Oxford University Press). [7]. Acton, F.S. 1970, Numerical Methods That Work; 1990, Parallel normreducing transformations for the algebraic eigenvalue Parallel normreducing transformations for the algebraic eigenvalue problem If you experience problems downloading a file, check if you have the proper The Multiplicative Inverse Eigenvalue Problem over an Algebraically The multiplicative inverse eigenvalue problem asks for the construction of a matrix in $Z$ such that the product matrix $MZ$ has characteristic Numerical Methods for Inverse Eigenvalue Problems [6] Z. Bohte, Numerical Solution of the Inverse Algebraic Eigenvalue Problem,. Comput. J., 10 (1968), 385–388. [7] D. Boley and G. Golub, A Survey of Matrix Krylov Subspace Methods for the Eigenvalue problem Templates for the Solution of Algebraic Eigenvalue. Problems: A Practical Guide, SIAM, Philadelphia, PA . http://www.cs.utk.edu/~dongarra/etemplates/book.html.