Pages that link to "Item:Q2564965"
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The following pages link to On the matrix equation \(X+A^ TX^{-1}A=I\) (Q2564965):
Displaying 21 items.
- On the positive stable solution to matrix equation of \(A^TXA=B\) (Q2744485) (← links)
- Some investigation on Hermitian positive-definite solutions of a nonlinear matrix equation (Q2921899) (← links)
- The inversion-free iterative methods for a system of nonlinear matrix equations (Q2957736) (← links)
- (Q3618743) (← links)
- Matrices Satisfying AB - BA = I (Q3778877) (← links)
- The matrix equation \(X^2 = A\) (Q3977892) (← links)
- (Q4244570) (← links)
- Iterative solution of two matrix equations (Q4257691) (← links)
- A two-sided iterative method for computing positive definite solutions of a nonlinear matrix equation (Q4461783) (← links)
- An algorithm for computing positive definite solutions of the nonlinear matrix equation<i>X</i> + <i>A</i>*<i>X</i><sup>−1</sup><i>A</i> = <i>I</i> (Q4467348) (← links)
- Efficient computation of the extreme solutions of $X+A^*X^{-1}A=Q$ and $X-A^*X^{-1}A=Q$ (Q4529712) (← links)
- (Q4571861) (← links)
- (Q4618386) (← links)
- The structure-preserving doubling algorithms for positive definite solution to a system of nonlinear matrix equations (Q4640098) (← links)
- Necessary and sufficient conditions for the existence of positive definite solutions of the matrix equation<i>X</i>+<i>A</i><sup>T</sup><i>X</i><sup>−2</sup><i>A</i>=<i>I</i> (Q5466769) (← links)
- Numerical solution of a quadratic eigenvalue problem (Q5916489) (← links)
- Two iteration processes for computing positive definite solutions of the equation \(X-A^*X^{-n}A=Q\) (Q5948734) (← links)
- Perturbation analysis of the maximal solution of the matrix equation \(X+A^*X^{-1}A=P\) (Q5954845) (← links)
- The maximal positive definite solution of the nonlinear matrix equation \(X + A^*X^{-1}A+B^*X^{-1}B = I \) (Q6066823) (← links)
- Several efficient iterative algorithms for solving nonlinear tensor equation \(\mathcal{X} + \mathcal{A}^T \ast_N \mathcal{X}^{-1} \ast_N \mathcal{A} = \mathcal{I}\) with Einstein product (Q6125430) (← links)
- Bauer's spectral factorization method for low order multiwavelet filter design (Q6145227) (← links)
