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The Riemannian two-step perturbed Gauss–Newton method for least squares inverse eigenvalue problems
Journal article
Zhao, Zhi, Jin, Xiao Qing, Yao, Teng Teng. The Riemannian two-step perturbed Gauss–Newton method for least squares inverse eigenvalue problems[J]. Journal of Computational and Applied Mathematics, 2022, 405, 113971.
Authors:
Zhao, Zhi
;
Jin, Xiao Qing
;
Yao, Teng Teng
Favorite
|
TC[WOS]:
1
TC[Scopus]:
1
IF:
2.1
/
2.1
|
Submit date:2022/05/13
Nonlinear Least Squares Problem
Parameterized Least Squares Inverse Eigenvalue Problem
Two-step Perturbed Gauss–newton Method
A geometric Gauss–Newton method for least squares inverse eigenvalue problems
Journal article
Yao,Teng Teng, Bai,Zheng Jian, Jin,Xiao Qing, Zhao,Zhi. A geometric Gauss–Newton method for least squares inverse eigenvalue problems[J]. BIT Numerical Mathematics, 2020, 60(3), 825-852.
Authors:
Yao,Teng Teng
;
Bai,Zheng Jian
;
Jin,Xiao Qing
;
Zhao,Zhi
Favorite
|
TC[WOS]:
7
TC[Scopus]:
8
IF:
1.6
/
1.8
|
Submit date:2021/03/09
Geometric Gauss–newton Method
Parameterized Least Squares Inverse Eigenvalue Problem
Preconditioner