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J. Z. Hearon, (1992), Nonsingular solutions of TA − BT = C. Linear Algebra Appl. 174:283–314.HearonJ. Z.1992Nonsingular solutions of TA − BT = C17428331410.1016/0024-3795(77)90019-2Search in Google Scholar
R. H. Bartel and G W. Stewart, (1994), Algorithm 432:Solution of the matrix equation AX + XB = C. Circ Syst Signal Proc, 13:820–826.BartelR. H.StewartG W.1994Algorithm 432:Solution of the matrix equation AX + XB = C13820826Search in Google Scholar
K. Jbilou, A. Messaoudi and H. Sadok, (1999), Global Fom and GMRES algorithms for matrix equations. Appl Numer Math, 31:49–63.JbilouK.MessaoudiA.SadokH.1999Global Fom and GMRES algorithms for matrix equations31496310.1016/S0168-9274(98)00094-4Search in Google Scholar
D. K. Salkuyeh and F. Toutounian, (2006), New approaches for solving large Sylvester equations. Appl Math Comput, 73:9–18.SalkuyehD. K.ToutounianF.2006New approaches for solving large Sylvester equations73918Search in Google Scholar
Y. Q. Lin, (2004), Implicitly restarted global FOM and GMRES for nonsymmetric matrix equations and Sylvester equations. Appl Math Comput, 167:1004–1025.LinY. Q.2004Implicitly restarted global FOM and GMRES for nonsymmetric matrix equations and Sylvester equations1671004102510.1016/j.amc.2004.06.141Search in Google Scholar
Y. H. Zheng, J. L. Li, D. X. Cheng and L. L. Lv, (2018), The Incomplete Global GMERR Algorithm to Solve AX = B. Journal of Computational Analysis and Applications, 24:760–772.ZhengY. H.LiJ. L.ChengD. X.LvL. L.2018The Incomplete Global GMERR Algorithm to Solve AX = B24760772Search in Google Scholar
Y. H. Zheng, D. X. Cheng and X. H. Qian, (2012), Global GMERR algorithm for linear systems with multiple right-hand sides. Journal of Northeast Normal University (Natural Science Edition), 44:41–45.ZhengY. H.ChengD. X.QianX. H.2012Global GMERR algorithm for linear systems with multiple right-hand sides444145Search in Google Scholar