The following publications are possibly variants of this publication:
- An iterative algorithm for the least Frobenius norm Hermitian and generalized skew Hamiltonian solutions of the generalized coupled Sylvester-conjugate matrix equationsBaohua Huang, Changfeng Ma. na, 78(4):1271-1301, 2018. [doi]
- Minimum-norm Hamiltonian solutions of a class of generalized Sylvester-conjugate matrix equationsJing-jing Hu, Chang-feng Ma. cma, 73(5):747-764, 2017. [doi]
- Gradient-based iterative algorithms for generalized coupled Sylvester-conjugate matrix equationsBaohua Huang, Chang-feng Ma. cma, 75(7):2295-2310, 2018. [doi]
- The relaxed gradient-based iterative algorithms for a class of generalized coupled Sylvester-conjugate matrix equationsBaohua Huang, Changfeng Ma. jfi, 355(6):3168-3195, 2018. [doi]
- On the least squares generalized Hamiltonian solution of generalized coupled Sylvester-conjugate matrix equationsBao-Hua Huang, Chang-feng Ma. cma, 74(3):532-555, 2017. [doi]
- Generalized conjugate direction method for solving a class of generalized coupled Sylvester-conjugate transpose matrix equations over generalized Hamiltonian matricesJia Tang, Chang-feng Ma. cma, 74(12):3303-3317, 2017. [doi]
- Iterative Methods to Solve the Generalized Coupled Sylvester-Conjugate Matrix Equations for Obtaining the Centrally Symmetric (Centrally Antisymmetric) Matrix SolutionsYajun Xie, Changfeng Ma. jam, 2014, 2014. [doi]
- An iterative algorithm for the least Frobenius norm least squares solution of a class of generalized coupled Sylvester-transpose linear matrix equationsBao-Hua Huang, Changfeng Ma. amc, 328:58-74, 2018. [doi]