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Linear Algebra and Its Applications
Volumn 435, Issue 6, 2011, Pages 1370-1398
Toward solution of matrix equation X=Af (X)B+C
Author keywords

Closed form solutions; Conjugated and transpose; Iteration; Matrix equations; Numerical solutions; Stein equations
Indexed keywords

CLOSED FORM SOLUTIONS; CONJUGATED AND TRANSPOSE; ITERATION; MATRIX EQUATIONS; NUMERICAL SOLUTION; STEIN EQUATION;
EID: 79958852535     PISSN: 00243795     EISSN: None     Source Type: Journal    
DOI: 10.1016/j.laa.2011.03.003     Document Type: Article
Times cited : (79)
References (30)
  • 2
    • 0000875808 scopus 로고
    • Controllability, observability and the solution of AX-XB=C
    • E. Desouza, and S.P. Bhattacharyya Controllability, observability and the solution of AX - XB = C Linear Algebra Appl. 39 1981 167 188
    • (1981) Linear Algebra Appl. , vol.39 , pp. 167-188
    • Desouza, E.1    Bhattacharyya, S.P.2
  • 3
    • 73149119779 scopus 로고    scopus 로고
    • The general coupled matrix equations over generalized bisymmetric matrices
    • M. Dehghan, and M. Hajarian The general coupled matrix equations over generalized bisymmetric matrices Linear Algebra Appl. 432 6 2010 1531 1552
    • (2010) Linear Algebra Appl. , vol.432 , Issue.6 , pp. 1531-1552
    • Dehghan, M.1    Hajarian, M.2
  • 4
    • 26244448321 scopus 로고    scopus 로고
    • Gradient based iterative algorithms for solving a class of matrix equations
    • DOI 10.1109/TAC.2005.852558
    • F. Ding, and T. Chen Gradient based iterative algorithms for solving a class of matrix equations IEEE Trans. Automat. Control 50 8 2005 1216 1221 (Pubitemid 41410122)
    • (2005) IEEE Transactions on Automatic Control , vol.50 , Issue.8 , pp. 1216-1221
    • Ding, F.1    Chen, T.2
  • 5
    • 38949156204 scopus 로고    scopus 로고
    • Iterative solutions of the generalized Sylvester matrix equations by using the hierarchical identification principle
    • DOI 10.1016/j.amc.2007.07.040, PII S0096300307007515
    • F. Ding, P.X. Liu, and J. Ding Iterative solutions of the generalized Sylvester matrix equations by using the hierarchical identification principle Appl. Math. Comput. 197 1 2008 41 50 (Pubitemid 351215477)
    • (2008) Applied Mathematics and Computation , vol.197 , Issue.1 , pp. 41-50
    • Ding, F.1    Liu, P.X.2    Ding, J.3
  • 8
    • 68349148334 scopus 로고    scopus 로고
    • Spectral properties of sums of certain Kronecker products
    • J. Feng, J. Lam, and Y. Wei Spectral properties of sums of certain Kronecker products Linear Algebra Appl. 431 9 2009 1691 1701
    • (2009) Linear Algebra Appl. , vol.431 , Issue.9 , pp. 1691-1701
    • Feng, J.1    Lam, J.2    Wei, Y.3
  • 9
    • 0018721357 scopus 로고
    • A Hessenberg-Schur method for the matrix problem AX + XB = C
    • G.H. Golub, S. Nash, and C.F. Van Loan A Hessenberg-Schur method for the matrix problem AX + XB = C IEEE Trans. Automat. Control 24 1979 909 913 (Pubitemid 10438868)
    • (1979) IEEE Transactions on Automatic Control , vol.AC-24 , Issue.6 , pp. 909-913
    • Golub, G.H.1    Nash, S.2    Van Loan, C.3
  • 10
    • 34250274439 scopus 로고
    • Some matrix equations over a finite field
    • J.H. Hodges Some matrix equations over a finite field Ann. Mat. Pura Appl. (4) 44 1957 245 250
    • (1957) Ann. Mat. Pura Appl. (4) , vol.44 , pp. 245-250
    • Hodges, J.H.1
  • 11
    • 0038986732 scopus 로고    scopus 로고
    • The matrix equation AXB-GXD=E over the quaternion field
    • L. Huang The matrix equation AXB - GXD = E over the quaternion field Linear Algebra Appl. 234 1996 197 208
    • (1996) Linear Algebra Appl. , vol.234 , pp. 197-208
    • Huang, L.1
  • 12
    • 0040773836 scopus 로고
    • Solution of the equation AX-XB=C by inversion of an M×M or N×N matrix
    • A. Jameson Solution of the equation AX - XB = C by inversion of an M × M or N × N matrix SIAM J. Appl. Math. 16 1968 1020 1023
    • (1968) SIAM J. Appl. Math. , vol.16 , pp. 1020-1023
    • Jameson, A.1
  • 13
    • 0037720091 scopus 로고    scopus 로고
    • On solution of the matrix equations X-AXB=C and X-AXB=C
    • T. Jiang, and M. Wei On solution of the matrix equations X - AXB = C and X - A X B = C Linear Algebra Appl. 367 2003 225 233
    • (2003) Linear Algebra Appl. , vol.367 , pp. 225-233
    • Jiang, T.1    Wei, M.2
  • 15
    • 0007414990 scopus 로고
    • Linear operators preserving certain equivalence relations originating in system theory
    • C.-K. Li, L. Rodman, and N.-K. Tsing Linear operators preserving certain equivalence relations originating in system theory Linear Algebra Appl. 161 15 1992 165 225
    • (1992) Linear Algebra Appl. , vol.161 , Issue.15 , pp. 165-225
    • Li, C.-K.1    Rodman, L.2    Tsing, N.-K.3
  • 16
    • 59749102582 scopus 로고    scopus 로고
    • Preservers of spectral radius, numerical radius, or spectral norm of the sum on nonnegative matrices
    • C.-K. Li, and L. Rodman Preservers of spectral radius, numerical radius, or spectral norm of the sum on nonnegative matrices Linear Algebra Appl. 430 7 2009 1739 1761
    • (2009) Linear Algebra Appl. , vol.430 , Issue.7 , pp. 1739-1761
    • Li, C.-K.1    Rodman, L.2
  • 17
    • 72749098584 scopus 로고    scopus 로고
    • Least squares solution with the minimum-norm to general matrix equations via iteration
    • Z.-Y. Li, Y. Wang, B. Zhou, and G.-R. Duan Least squares solution with the minimum-norm to general matrix equations via iteration Appl. Math. Comput. 215 10 2010 3547 3562
    • (2010) Appl. Math. Comput. , vol.215 , Issue.10 , pp. 3547-3562
    • Li, Z.-Y.1    Wang, Y.2    Zhou, B.3    Duan, G.-R.4
  • 18
    • 0012063914 scopus 로고
    • The iterative solution of the matrix equation XA+BX+C=0
    • D.F. Miller The iterative solution of the matrix equation XA + BX + C = 0 Linear Algebra Appl. 105 1988 131 137
    • (1988) Linear Algebra Appl. , vol.105 , pp. 131-137
    • Miller, D.F.1
  • 20
    • 0001052499 scopus 로고
    • Matrix equation XA+BX=C
    • R.A. Smith Matrix equation XA + BX = C SIAM J. Appl. Math. 16 1 1968 198 201
    • (1968) SIAM J. Appl. Math. , vol.16 , Issue.1 , pp. 198-201
    • Smith, R.A.1
  • 21
    • 77953137361 scopus 로고    scopus 로고
    • Determinant and Pfaffian of sum of skew symmetric matrices
    • T.Y. Tam, and M.C. Thompson Determinant and Pfaffian of sum of skew symmetric matrices Linear Algebra Appl. 433 2 2010 412 423
    • (2010) Linear Algebra Appl. , vol.433 , Issue.2 , pp. 412-423
    • Tam, T.Y.1    Thompson, M.C.2
  • 23
    • 0039123490 scopus 로고
    • Linear matrix equations: The module theoretic approach
    • H.K. Wimmer Linear matrix equations: the module theoretic approach Linear Algebra Appl. 120 1989 149 164
    • (1989) Linear Algebra Appl. , vol.120 , pp. 149-164
    • Wimmer, H.K.1
  • 24
    • 67349285076 scopus 로고    scopus 로고
    • On Smith-type iterative algorithms for the Stein matrix equation
    • B. Zhou, J. Lam, and G.R. Duan On Smith-type iterative algorithms for the Stein matrix equation Appl. Math. Lett. 22 2009 1038 1044
    • (2009) Appl. Math. Lett. , vol.22 , pp. 1038-1044
    • Zhou, B.1    Lam, J.2    Duan, G.R.3
  • 25
    • 17744390556 scopus 로고    scopus 로고
    • An explicit solution to the matrix equation AX - XF = by
    • DOI 10.1016/j.laa.2005.01.018, PII S0024379505000571
    • B. Zhou, and G.R. Duan An explicit solution to the matrix equation AX - XF = BY Linear Algebra Appl. 402 3 2005 345 366 (Pubitemid 40574444)
    • (2005) Linear Algebra and Its Applications , vol.402 , Issue.1-3 , pp. 345-366
    • Zhou, B.1    Duan, G.-R.2
  • 27
    • 78649445080 scopus 로고    scopus 로고
    • How to solve the matrix equation XA-AX=f (X)
    • G. Bourgeois How to solve the matrix equation XA - AX = f (X ) Linear Algebra Appl. 434 3 2011 657 668
    • (2011) Linear Algebra Appl. , vol.434 , Issue.3 , pp. 657-668
    • Bourgeois, G.1
  • 28
    • 78049416589 scopus 로고    scopus 로고
    • AXT=0 and its application to the theory of orbits
    • AXT = 0 and its application to the theory of orbits Linear Algebra Appl. 434 1 2011 44 67
    • (2011) Linear Algebra Appl. , vol.434 , Issue.1 , pp. 44-67
    • De Teran, F.1    Dopico, F.M.2
  • 29
    • 77955427853 scopus 로고    scopus 로고
    • Positive solutions to operator equations AXB=C
    • M.L. Arias, and M.C. Gonzalez Positive solutions to operator equations AXB = C Linear Algebra Appl. 433 6 2011 1194 1202
    • (2011) Linear Algebra Appl. , vol.433 , Issue.6 , pp. 1194-1202
    • Arias, M.L.1    Gonzalez, M.C.2
  • 30
    • 77349083215 scopus 로고    scopus 로고
    • ADI preconditioned Krylov methods for large Lyapunov matrix equations
    • K. Jbilou ADI preconditioned Krylov methods for large Lyapunov matrix equations Linear Algebra Appl. 432 10 2010 2473 2485
    • (2010) Linear Algebra Appl. , vol.432 , Issue.10 , pp. 2473-2485
    • Jbilou, K.1

* 이 정보는 Elsevier사의 SCOPUS DB에서 KISTI가 분석하여 추출한 것입니다.