A Study on the Convergence Analysis of the Inexact Simplified Jacobi–Davidson Method

The Jacobi–Davidson iteration method is very efficient in solving Hermitian eigenvalue problems. If the correction equation involved in the Jacobi–Davidson iteration is solved accurately, the simplified Jacobi–Davidson iteration is equivalent to the Rayleigh quotient iteration which achieves cubic convergence rate locally. When the involved linear system is solved by an iteration method, these two methods are also equivalent. In this paper, we present the convergence analysis of the simplified Jacobi–Davidson method and present the estimate of iteration numbers of the inner correction equation. Furthermore, based on the convergence factor, we can see how the accuracy of the inner iteration controls the outer iteration.

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A convergence analysis of the inexact Rayleigh quotient iteration and simplified Jacobi-Davidson method for the large Hermitian matrix eigenproblem

Science in China Series A Mathematics ◽

10.1007/s11425-008-0050-y ◽

2008 ◽

Vol 51 (12) ◽

pp. 2205-2216 ◽

Cited By ~ 4

Author(s):

ZhongXiao Jia ◽

Zhen Wang

Keyword(s):

Convergence Analysis ◽

Hermitian Matrix ◽

Rayleigh Quotient ◽

Davidson Method ◽

Rayleigh Quotient Iteration

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MN-PGSOR Method for Solving Nonlinear Systems with Block Two-by-Two Complex Symmetric Jacobian Matrices

Journal of Mathematics ◽

10.1155/2021/4393353 ◽

2021 ◽

Vol 2021 ◽

pp. 1-18

Author(s):

Yu-Ye Feng ◽

Qing-Biao Wu

Keyword(s):

Nonlinear Systems ◽

Iteration Method ◽

Computing Time ◽

Coefficient Matrix ◽

New Method ◽

Jacobian Matrices ◽

Modified Newton Method ◽

Preconditioned Matrix ◽

Outer Iteration ◽

Inner Iteration

For solving the large sparse linear systems with 2 × 2 block structure, the generalized successive overrelaxation (GSOR) iteration method is an efficient iteration method. Based on the GSOR method, the PGSOR method introduces a preconditioned matrix with a new parameter for the coefficient matrix which can enhance the efficiency. To solve the nonlinear systems in which the Jacobian matrices are complex and symmetric with the block two-by-two form, we try to use the PGSOR method as an inner iteration, with the help of the modified Newton method as an efficient outer iteration method. This new method is called the modified Newton-PGSOR (MN-PGSOR) method. Local convergence properties of the MN-PGSOR are analyzed under the Hölder condition. Finally, we give the comparison of our new method with some previous methods in the numerical results. The MN-PGSOR method is superior in both iteration steps and computing time.

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A Filtered-Davidson Method for Large Symmetric Eigenvalue Problems

East Asian Journal on Applied Mathematics ◽

10.4208/eajam.160816.131016a ◽

2017 ◽

Vol 7 (1) ◽

pp. 21-37 ◽

Cited By ~ 5

Author(s):

Cun-Qiang Miao

Keyword(s):

Convergence Rate ◽

Chebyshev Polynomials ◽

Numerical Experiments ◽

Eigenvalue Problems ◽

Cubic Convergence ◽

Davidson Method ◽

Filtering Technique ◽

Matrix Vector ◽

Three Term Recurrence Relation ◽

Symmetric Eigenvalue Problems

AbstractFor symmetric eigenvalue problems, we constructed a three-term recurrence polynomial filter by means of Chebyshev polynomials. The new filtering technique does not need to solve linear systems and only needs matrix-vector products. It is a memory conserving filtering technique for its three-term recurrence relation. As an application, we use this filtering strategy to the Davidson method and propose the filtered-Davidson method. Through choosing suitable shifts, this method can gain cubic convergence rate locally. Theory and numerical experiments show the efficiency of the new filtering technique.

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