Iterative methods for the extremal positive definite solution of the matrix equation \(X+A^{*}X^{-\alpha}A=Q\)
From MaRDI portal
Publication:869490
DOI10.1016/j.cam.2006.01.033zbMath1118.65029OpenAlexW2133024128MaRDI QIDQ869490
Salah M. El-Sayed, Zhen-yun Peng, Xiang Lin Zhang
Publication date: 8 March 2007
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2006.01.033
algorithmsconvergencenumerical examplesiterative methodsmaximal solutionpositive definite matrixmatrix equationminimal solutioninversion free
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (38)
On the Hermitian positive definite solutions of nonlinear matrix equation \(X^s + \sum_{i = 1}^m A_i^\ast X^{- t_i} A_i = Q\) ⋮ Iterative algorithms for \(X+A^{\mathrm T}X^{-1}A=I\) by using the hierarchical identification principle ⋮ On an inversion-free algorithm for the nonlinear matrix problem Xα+A∗X−βA+B∗X−γB=I, ⋮ Investigation of the existence and uniqueness of extremal and positive definite solutions of nonlinear matrix equations ⋮ Solutions and perturbation estimates for the matrix equation \(X^s+A^*X^{-t}A=Q\) ⋮ On the perturbation estimates of the maximal solution for the matrix equation \(X + A^T \sqrt{X^{- 1}} A = P\) ⋮ Unnamed Item ⋮ On the nonlinear matrix equation \(X+A*X - qA=Q\) \((q\geq 1)\) ⋮ The Hermitian positive definite solution of the nonlinear matrix equation ⋮ Necessary and sufficient conditions for the existence of a positive definite solution for the matrix equation \(X + \sum^m_{i = 1} A^T_i X^{\delta_i} A_i = I\) ⋮ Positive definite solutions of the matrix equations ⋮ On the existence of extremal positive definite solutions of the nonlinear matrix equation ⋮ Generalized conjugate direction algorithm for solving general coupled Sylvester matrix equations ⋮ On the Hermitian positive definite solutions of nonlinear matrix equation \(X^s + A^\ast X^{-t_1} A + B^\ast X^{-t_2} B = Q\) ⋮ The inversion-free iterative methods for a system of nonlinear matrix equations ⋮ The extremal solution of the matrix equation \(X^s+A^\ast X^{-q}A=I\) ⋮ Solutions and perturbation analysis for the nonlinear matrix equation \(X + \sum^m_{i=1} A^*_i X^{-1} A_i = I\) ⋮ Quasi gradient-based inversion-free iterative algorithm for solving a class of the nonlinear matrix equations ⋮ Perturbation analysis for the matrix equation \(X - \sum^m_{i=1} A^\ast_i XA_i + \sum^n_{j=1} B^\ast_j XB_j = I\) ⋮ Positive definite solution of the matrix equation \(X = Q - A{^*}X^{-1}A + B{^*}X^{- 1}B\) via Bhaskar-Lakshmikantham fixed point theorem ⋮ Matrix bounds for the solution of the continuous algebraic Riccati equation ⋮ On the positive operator solutions to an operator equation ⋮ New solution bounds for the continuous algebraic Riccati equation ⋮ An improved inversion-free method for solving the matrix equation \(X + A^\ast X^{-{\alpha}}A = Q\) ⋮ The structure-preserving doubling algorithms for positive definite solution to a system of nonlinear matrix equations ⋮ Bounds for the eigenvalues of the continuous algebraic Riccati equation ⋮ Positive definite solutions and perturbation analysis of a class of nonlinear matrix equations ⋮ Two structure-preserving-doubling like algorithms for obtaining the positive definite solution to a class of nonlinear matrix equation ⋮ Positive definite solutions of the nonlinear matrix equation \(X+A^*X^qA=Q\) (\(q>0\)). ⋮ On the Hermitian positive definite solutions of nonlinear matrix equation \(X^s + A^*X^{-t}A = Q\) ⋮ On equations that are equivalent to the nonlinear matrix equation \(X+A^{*}X ^{-\alpha}A=Q\) ⋮ On the Hermitian positive definite solution of the nonlinear matrix equation ⋮ Unnamed Item ⋮ Latest inversion-free iterative scheme for solving a pair of nonlinear matrix equations ⋮ An iterative method to solve a nonlinear matrix equation ⋮ Newton's iterative method to solve a nonlinear matrix equation ⋮ The inversion-free iterative methods for solving the nonlinear matrix equation \(X + A^H X^{- 1} A + B^H X^{- 1} B = I\) ⋮ On the matrix equation arising in an interpolation problem
Cites Work
- Unnamed Item
- Unnamed Item
- A new inversion free iteration for solving the equation \(X + A^{\star} X^{-1} A = Q\)
- Positive solutions to \(X=A-BX^{-1}B^*\)
- Properties of positive definite solutions of the equation \(X+A^*X^{-2}A=I\)
- On the existence of a positive definite solution of the matrix equation \(X+A^ T X^{-1} A=I\)
- Operator inequalities associated with Hölder-McCarthy and Kantorovich inequalities
- On positive definite solutions of the nonlinear matrix equation \(X+A^* X^{-n} A=I\)
- Some properties for the existence of a positive definite solution of matrix equation \(X+A^*X^{-2^m}A=I\)
- Solutions and perturbation estimates for the matrix equations \(X\pm A^*X^{-n}A=Q\)
- Positive definite solutions of the matrix equations \(X\pm A^{\ast}X^{-q} A=Q\)
- Iterative methods for nonlinear matrix equations \(X+ A^{\star}X^{-\alpha}A = I\)
- On the matrix equation \(X+A^{T} \root 2^m \of {X^{-1}}A+I\)
- Hermitian solutions of the equation \(X=Q+NX^{-1}N^*\)
- On an Iteration Method for Solving a Class of Nonlinear Matrix Equations
- Iterative solution of two matrix equations
- Computing the Extremal Positive Definite Solutions of a Matrix Equation
- On matrix equations \(X\pm A^*X^{-2}A=I\)
This page was built for publication: Iterative methods for the extremal positive definite solution of the matrix equation \(X+A^{*}X^{-\alpha}A=Q\)
