Masoud Hajarian
Orcid: 0000-0002-5549-9270
According to our database1,
Masoud Hajarian
authored at least 68 papers
between 2008 and 2025.
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Bibliography
2025
Iterative algorithms based on weight splitting to solve Riccati matrix equation XDX-XC-BX+A=0.
Comput. Appl. Math., February, 2025
High-efficiency parametric iterative schemes for solving nonlinear equations with and without memory.
J. Complex., 2025
2024
Numer. Algorithms, October, 2024
Splitting iteration methods to solve non-symmetric algebraic Riccati matrix equation YAY-YB-CY+D=0.
Numer. Algorithms, October, 2024
Finding solution of linear systems via new forms of BiCG, BiCGstab and CGS algorithms.
Comput. Appl. Math., September, 2024
On sign function of tensors with Einstein product and its application in solving Yang-Baxter tensor equation.
Comput. Appl. Math., September, 2024
Numer. Linear Algebra Appl., August, 2024
Numer. Linear Algebra Appl., August, 2024
An improved Riemannian conjugate gradient method and its application to robust matrix completion.
Numer. Algorithms, August, 2024
A New Prediction-Correction Primal-Dual Hybrid Gradient Algorithm for Solving Convex Minimization Problems with Linear Constraints.
J. Math. Imaging Vis., June, 2024
Fixed-Point Iteration Schemes to Solve Symmetric Algebraic Riccati Equation XBX-XA-A<sup>T</sup>X-C=0.
Circuits Syst. Signal Process., June, 2024
Comput. Optim. Appl., March, 2024
Several efficient iterative algorithms for solving nonlinear tensor equation <i>X</i>+<i>A</i><sup>T</sup>*<sub>N</sub> X<sup>-1</sup>*<sub>N</sub> A=<i>I</i> with Einstein product.
Comput. Appl. Math., March, 2024
Developing variable s-step CGNE and CGNR algorithms for non-symmetric linear systems.
J. Frankl. Inst., 2024
2023
J. Optim. Theory Appl., June, 2023
Weight splitting iteration methods to solve quadratic nonlinear matrix equation MY2+NY+P=0.
J. Frankl. Inst., February, 2023
Int. J. Comput. Math., 2023
2022
An efficient Gauss-Newton algorithm for solving regularized total least squares problems.
Numer. Algorithms, 2022
On the generalized AOR and CG iteration methods for a class of block two-by-two linear systems.
Numer. Algorithms, 2022
Triangular Decomposition of CP Factors of a Third-Order Tensor with Application to Solving Nonlinear Systems of Equations.
J. Sci. Comput., 2022
J. Frankl. Inst., 2022
An iterative method based on ADMM for solving generalized Sylvester matrix equations.
J. Frankl. Inst., 2022
Convergence analysis of Newton method without inversion for solving discrete algebraic Riccati equations.
J. Frankl. Inst., 2022
An efficient inversion-free method for solving the nonlinear matrix equation Xp+∑j=1mAj*X-qjAj=Q.
J. Frankl. Inst., 2022
A robust meta-heuristic adaptive Bi-CGSTAB algorithm to online estimation of a three DoF state-space model in the presence of disturbance and uncertainty.
Int. J. Syst. Sci., 2022
2021
Conjugate gradient-like algorithms for constrained operator equation related to quadratic inverse eigenvalue problems.
Comput. Appl. Math., 2021
2020
Trans. Inst. Meas. Control, 2020
An extension of the Cayley transform method for a parameterized generalized inverse eigenvalue problem.
Numer. Linear Algebra Appl., 2020
Conjugate gradient-like methods for solving general tensor equation with Einstein product.
J. Frankl. Inst., 2020
Comput. Math. Appl., 2020
2019
Three types of biconjugate residual method for general periodic matrix equations over generalized bisymmetric periodic matrices.
Trans. Inst. Meas. Control, 2019
An efficient algorithm based on Lanczos type of BCR to solve constrained quadratic inverse eigenvalue problems.
J. Comput. Appl. Math., 2019
2018
Finding solutions for periodic discrete-time generalized coupled Sylvester matrix equations via the generalized BCR method.
Trans. Inst. Meas. Control, 2018
Least squares solutions of quadratic inverse eigenvalue problem with partially bisymmetric matrices under prescribed submatrix constraints.
Comput. Math. Appl., 2018
Solving constrained quadratic inverse eigenvalue problem via conjugate direction method.
Comput. Math. Appl., 2018
Computing symmetric solutions of general Sylvester matrix equations via Lanczos version of biconjugate residual algorithm.
Comput. Math. Appl., 2018
Periodic conjugate direction algorithm for symmetric periodic solutions of general coupled periodic matrix equations.
Comput. Math. Appl., 2018
2017
Convergence of HS version of BCR algorithm to solve the generalized Sylvester matrix equation over generalized reflexive matrices.
J. Frankl. Inst., 2017
2016
Convergence of a transition probability tensor of a higher-order Markov chain to the stationary probability vector.
Numer. Linear Algebra Appl., 2016
Numer. Algorithms, 2016
Generalized conjugate direction algorithm for solving the general coupled matrix equations over symmetric matrices.
Numer. Algorithms, 2016
Symmetric solutions of the coupled generalized Sylvester matrix equations via BCR algorithm.
J. Frankl. Inst., 2016
Extending the CGLS algorithm for least squares solutions of the generalized Sylvester-transpose matrix equations.
J. Frankl. Inst., 2016
Solving the general Sylvester discrete-time periodic matrix equations via the gradient based iterative method.
Appl. Math. Lett., 2016
2015
Finite algorithms for solving the coupled Sylvester-conjugate matrix equations over reflexive and Hermitian reflexive matrices.
Int. J. Syst. Sci., 2015
A Finite Iterative Method for Solving the General Coupled Discrete-Time Periodic Matrix Equations.
Circuits Syst. Signal Process., 2015
2014
Developing Bi-CG and Bi-CR Methods to Solve Generalized Sylvester-transpose Matrix Equations.
Int. J. Autom. Comput., 2014
Appl. Math. Lett., 2014
2013
Matrix iterative methods for solving the Sylvester-transpose and periodic Sylvester matrix equations.
J. Frankl. Inst., 2013
Int. J. Autom. Comput., 2013
The generalized QMRCGSTAB algorithm for solving Sylvester-transpose matrix equations.
Appl. Math. Lett., 2013
2012
The generalised Sylvester matrix equations over the generalised bisymmetric and skew-symmetric matrices.
Int. J. Syst. Sci., 2012
2011
Two class of synchronous matrix multisplitting schemes for solving linear complementarity problems.
J. Comput. Appl. Math., 2011
Two algorithms for finding the Hermitian reflexive and skew-Hermitian solutions of Sylvester matrix equations.
Appl. Math. Lett., 2011
2010
An efficient algorithm for solving general coupled matrix equations and its application.
Math. Comput. Model., 2010
Math. Comput. Model., 2010
On the reflexive and anti-reflexive solutions of the generalised coupled Sylvester matrix equations.
Int. J. Syst. Sci., 2010
Int. J. Comput. Math., 2010
Comput. Math. Appl., 2010
2009
Oper. Res. Lett., 2009
Finite iterative algorithms for the reflexive and anti-reflexive solutions of the matrix equation A<sub>1</sub>X<sub>1</sub>B<sub>1</sub>+A<sub>2</sub>X<sub>2</sub>B<sub>2</sub>=C.
Math. Comput. Model., 2009
Determination of a matrix function using the divided difference method of Newton and the interpolation technique of Hermite.
J. Comput. Appl. Math., 2009
Appl. Math. Lett., 2009
2008
An iterative algorithm for solving a pair of matrix equations AYB=E, CYD=F over generalized centro-symmetric matrices.
Comput. Math. Appl., 2008
An iterative algorithm for the reflexive solutions of the generalized coupled Sylvester matrix equations and its optimal approximation.
Appl. Math. Comput., 2008