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There is a page named "Jacobi eigenvalue algorithm" on Wikipedia
- numerical linear algebra, the Jacobi eigenvalue algorithm is an iterative method for the calculation of the eigenvalues and eigenvectors of a real symmetric...24 KB (3,929 words) - 17:31, 1 July 2024
- is designing efficient and stable algorithms for finding the eigenvalues of a matrix. These eigenvalue algorithms may also find eigenvectors. Given an...40 KB (4,865 words) - 12:52, 24 July 2024
- linear equations Jacobi eigenvalue algorithm, a method for calculating the eigenvalues and eigenvectors of a real symmetric matrix Jacobi elliptic functions...1 KB (201 words) - 12:46, 4 November 2022
Carl Gustav Jacob Jacobi (/dʒəˈkoʊbi/; German: [jaˈkoːbi]; 10 December 1804 – 18 February 1851) was a German mathematician who made fundamental contributions...20 KB (2,058 words) - 04:18, 10 July 2024
{\displaystyle M} . Two-sided Jacobi SVD algorithm—a generalization of the Jacobi eigenvalue algorithm—is an iterative algorithm where a square matrix is iteratively...86 KB (13,746 words) - 19:52, 3 August 2024- Pidgin code (category Algorithm description languages)code: Algorithm Conjugate gradient method Ford-Fulkerson algorithm Gauss–Seidel method Generalized minimal residual method Jacobi eigenvalue algorithm Jacobi...2 KB (234 words) - 21:00, 13 May 2024
- Jacobi−Trudi identities Jacobi conformal projections Jacobi coordinates Jacobi eigenvalue algorithm Jacobi ellipsoid Jacobi elliptic functions Jacobi...2 KB (187 words) - 18:01, 20 March 2022
- List of numerical analysis topics (redirect from List of eigenvalue algorithms)field QR algorithm Jacobi eigenvalue algorithm — select a small submatrix which can be diagonalized exactly, and repeat Jacobi rotation — the building block...70 KB (8,336 words) - 05:14, 24 June 2024
- In numerical linear algebra, the Jacobi method (a.k.a. the Jacobi iteration method) is an iterative algorithm for determining the solutions of a strictly...13 KB (2,195 words) - 13:26, 18 April 2024
Computational physics (section Methods and algorithms)difference method and relaxation method) matrix eigenvalue problem (using e.g. Jacobi eigenvalue algorithm and power iteration) All these methods (and several...14 KB (1,395 words) - 22:11, 21 July 2024- &\\{*}&&&\cdots &&&*\end{bmatrix}}.} It is the core operation in the Jacobi eigenvalue algorithm, which is numerically stable and well-suited to implementation...14 KB (2,895 words) - 20:27, 16 June 2024
Numerical analysis (redirect from Numerical algorithm)phrased in terms of eigenvalue decompositions or singular value decompositions. For instance, the spectral image compression algorithm is based on the singular...38 KB (3,882 words) - 04:24, 5 August 2024- fast-multipole) Eigenvalue algorithms Arnoldi iteration Inverse iteration Jacobi method Lanczos iteration Power iteration QR algorithm Rayleigh quotient...71 KB (7,827 words) - 14:31, 6 August 2024
- Preconditioner (redirect from Jacobi preconditioner)solving eigenvalue problems. In many cases, it may be beneficial to change the preconditioner at some or even every step of an iterative algorithm in order...22 KB (3,511 words) - 04:16, 29 April 2024
- (D^{-1}D')=\mathrm {tr} (A^{-1}A'),} which is the Jacobi formula for matrices A with distinct nonzero eigenvalues. The following is a useful relation connecting...10 KB (2,108 words) - 08:48, 10 August 2024
- A Jacobi operator, also known as Jacobi matrix, is a symmetric linear operator acting on sequences which is given by an infinite tridiagonal matrix. It...5 KB (791 words) - 19:00, 14 June 2024
- Householder transformation (redirect from Householder algorithm)reflector, then P u = u {\textstyle Pu=u} , i.e., 1 {\textstyle 1} is an eigenvalue of multiplicity n − 1 {\textstyle n-1} , since there are n − 1 {\textstyle...15 KB (2,267 words) - 04:26, 22 May 2024
- Gauss–Legendre quadrature (section Algorithms)an eigenvalue problem which is solved by the QR algorithm. This algorithm was popular, but significantly more efficient algorithms exist. Algorithms based...13 KB (1,597 words) - 04:38, 25 March 2024
showed, in 1829, that the eigenvalues of symmetric matrices are real. Jacobi studied "functional determinants"—later called Jacobi determinants by Sylvester—which...106 KB (13,096 words) - 09:11, 30 July 2024- Pi (section Eigenvalues)form of the Dirichlet eigenvalue problem in one dimension, the Poincaré inequality is the variational form of the Neumann eigenvalue problem, in any dimension...146 KB (17,390 words) - 14:59, 17 August 2024
- 1994) Ch. 2, The Flight Of The baseball, p. 22. I ought also to mention [Jacobi]'s papers on Abelian transcendants; his investigations on the theory of
- {\displaystyle U\!\,} is an upper triangular matrix also with a zero diagonal. The Jacobi iteration can be found by substituting into A x = b {\displaystyle Ax=b\