Your search keyword '"Shao, Xin-Hui"' showing total 5 results

1. Two Preconditioners for Time-Harmonic Eddy-Current Optimal Control Problems.

Author

Shao, Xin-Hui and Dong, Jian-Rong

Subjects

*SCHUR complement, *KRYLOV subspace, *LINEAR systems, *EIGENVALUES, *COMPUTER simulation

Abstract

In this paper, we consider the numerical solution of a large complex linear system with a saddle-point form obtained by the discretization of the time-harmonic eddy-current optimal control problem. A new Schur complement is proposed for this algebraic system, extending it to both the block-triangular preconditioner and the structured preconditioner. A theoretical analysis proves that the eigenvalues of block-triangular and structured preconditioned matrices are located in the interval [1/2, 1]. Numerical simulations show that two new preconditioners coupled with a Krylov subspace acceleration have good feasibility and effectiveness and are superior to some existing efficient algorithms. [ABSTRACT FROM AUTHOR]

Published

2024

2. Modified DTS Iteration Methods for Spatial Fractional Diffusion Equations.

Author

Shao, Xin-Hui and Kang, Chong-Bo

Subjects

*TOEPLITZ matrices, *SPATIAL systems, *LINEAR systems

Abstract

For the discretized linear systems of the spatial fractional diffusion equations, we construct a class of a modified DTS iteration method and give its asymptotic convergence conditions. Then, we design a fast modified DTS preconditioner by replacing Toeplitz matrix T with the τ matrix to accelerate the convergence rates of GMRES method. Theoretically, we show that the spectrum of fast modified DTS preconditioned matrix is clustered around one. Numerical experiments verify the validity of the constructed fast modified DTS preconditioner for GMRES method. [ABSTRACT FROM AUTHOR]

Published

2023

3. New Preconditioned Iteration Method Solving the Special Linear System from the PDE-Constrained Optimal Control Problem.

Author

Li, Yan-Ran, Shao, Xin-Hui, Li, Shi-Yu, and Scapellato, Andrea

Subjects

*LINEAR systems, *KRYLOV subspace, *PARTIAL differential equations, *CONSTRAINED optimization, *PROBLEM solving

Abstract

In many fields of science and engineering, partial differential equation (PDE) constrained optimal control problems are widely used. We mainly solve the optimization problem constrained by the time-periodic eddy current equation in this paper. We propose the three-block splitting (TBS) iterative method and proved that it is unconditionally convergent. At the same time, the corresponding TBS preconditioner is derived from the TBS iteration method, and we studied the spectral properties of the preconditioned matrix. Finally, numerical examples in two-dimensions is applied to demonstrate the advantages of the TBS iterative method and TBS preconditioner with the Krylov subspace method. [ABSTRACT FROM AUTHOR]

Published

2021

4. The Four-Parameter PSS Method for Solving the Sylvester Equation.

Author

Shen, Hai-Long, Li, Yan-Ran, and Shao, Xin-Hui

Subjects

SYLVESTER matrix equations, ITERATIVE methods (Mathematics), COEFFICIENTS (Statistics), NUMERICAL analysis, SPLITTING extrapolation method

Abstract

In order to solve the Sylvester equations more efficiently, a new four parameters positive and skew-Hermitian splitting (FPPSS) iterative method is proposed in this paper based on the previous research of the positive and skew-Hermitian splitting (PSS) iterative method. We prove that when coefficient matrix A and B satisfy certain conditions, the FPPSS iterative method is convergent in the parameter's value region. The numerical experiment results show that compared with previous iterative method, the FPPSS iterative method is more effective in terms of iteration number IT and runtime. [ABSTRACT FROM AUTHOR]

Published

2019

5. PHSS Iterative Method for Solving Generalized Lyapunov Equations †.

Author

Li, Shi-Yu, Shen, Hai-Long, and Shao, Xin-Hui

Subjects

ITERATIVE methods (Mathematics), LYAPUNOV functions, THEORY of distributions (Functional analysis), STOCHASTIC convergence, MATHEMATICAL proofs

Abstract

Based on previous research results, we propose a new preprocessing HSS iteration method (PHSS) for the generalized Lyapunov equation. At the same time, the corresponding inexact PHSS algorithm (IPHSS) is given from the angle of application. All the new methods presented in this paper have given the corresponding convergence proof. The numerical experiments are carried out to compare the new method with the existing methods, and the improvement effect is obvious. The feasibility and effectiveness of the proposed method are proved from two aspects of theory and calculation. [ABSTRACT FROM AUTHOR]

Published

2019