https://orcid.org/0000-0003-0655-3741
References
- Ben-Israel A, Greville TNE. Generalized inverses: theory and applications. 2nd ed. New York (NY): Springer; 2003.
- Manjunatha Prasad K. An introduction to generalized inverse. In: Bapat RB, Kirkland S, Manjunatha Prasad K, Puntanen S, editors. Lectures on matrix and graph methods. Manipal: Manipal University Press; 2012. p. 43–60.
- Manjunatha Prasad K, Mohana KS. Core-EP inverse. Linear Multilinear Algebra. 2014;62:792–802.
- Manjunatha Prasad K, Bhaskara Rao KPS, Bapat RB. Generalized inverses over integral domains II. Group inverses and Drazin inverses. Linear Algebra Appl. 1991;146:31–47.
- Wang G, Wei Y, Qiao S. Generalized inverses: theory and computations. Singapore/Beijing: Springer/Science Press; 2018. (Developments in mathematics; 53).
- Cao CG, Zhang X. The generalized inverse AT,∗(2) and its applications. J Appl Math Comput. 2003;11(1–2):155–164.
- Chen Y, Chen X. Representation and approximation of the outer inverse AT,S(2) of a matrix A. Linear Algebra Appl. 2000;308:85–107.
- Ke Y, Chen J, Stanimirović P. Characterizations and representations of outer inverse for matrices over a ring. Linear Multilinear Algebra. 2019;69. doi:10.1080/03081087.2019.1590302.
- Sheng X, Chen G. Full-rank representation of generalized inverse AT,S(2) and its application. Comput Math Appl. 2007;54:1422–1430.
- Stanimirović PS, Pappas D, Katsikis VN, et al. Symbolic computation of AT,S(2)-inverses using QDR factorization. Linear Algebra Appl. 2012;437:1317–1331.
- Wei Y, Wu H. The representation and approximation for the generalized inverse AT,S(2). Appl Math Comput. 2003;135:263–276.
- Yang H, Liu D. The representation of generalized inverse AT,S(2) and its applications. J Comput Appl Math. 2009;224:204–209.
- Yu Y, Wang G. The generalized inverse AT,S(2) over commutative rings. Linear Multilinear Algebra. 2005;53(4):293–302.
- Yu Y, Wang G. DFT calculation for the {2}-inverse of a polynomial matrix with prescribed image and kernel. Appl Math Comput. 2009;215:2741–2749.
- Grevile TNE. Some applications of the pseudo-inverse of matrix. SIAM Rev. 1960;3:15–22.
- Jones J, Karampetakis NP, Pugh AC. The computation and application of the generalized inverse via maple. J Symb Comput. 1998;25:99–124.
- Karampetakis NP. Generalized inverses of two-variable polynomial matrices and applications. Circuits Syst Signal Process. 1997;16:439–453.
- Krishnamurthy EV. Generalized matrix inverse approach for automatic balancing of chemical equations. Int J Math Educ Sci Technol. 1978;2:323–328.
- Vibet C. Application of linear network computer formulation to check a symbolic matrix inversion program. Comput Appl Eng Educ. 1997;5:189–197.
- Drazin MP. A class of outer generalized inverses. Linear Algebra Appl. 2012;436:1909–1923.
- Caravantes J, Sendra JR, Sendra J. A Maple package for the symbolic computation of Drazin inverse matrices with multivariate transcendental functions entries. In: Gerhard J, Kotsireas I, editors. Maple in mathematics education and research. Springer Nature Switzerland AG; 2020. pp. 1–15. (Communications in computer and information science, vol. 1125).
- Fragulis G, Mertzios BG, Vardulakis AIG. Computation of the inverse of a polynomial matrix and evaluation of its Laurent expansion. Int J Control. 1991;53:431–443.
- Karampetakis NP. Computation of the generalized inverse of a polynomial matrix and applications. Linear Algebra Appl. 1997;252:35–60.
- Petković MD, Stanimirović PS, Tasić MB. Effective partitioning method for computing weighted Moore-Penrose inverse. Comput Math Appl. 2008;55:1720–1734.
- Petković MD, Stanimirović PS. Symbolic computation of the Moore-Penrose inverse using partitioning method. Int J Comput Math. 2005;82:355–367.
- Sendra JR, Sendra J. Symbolic computation of Drazin inverses by specializations. J Comput Appl Math. 2016;301:201–212.
- Sendra JR, Sendra J. Computation of Moore-Penrose generalized inverses of matrices with meromorphic function entries. Appl Math Comput. 2017;313:355–366.
- Sendra JR, Sendra J. Gröbner basis computation of Drazin inverses with multivariate rational function entries. J Comput Appl Math. 2015;259:450–459.
- Stanimirović PS, Soleymani F. A class of numerical algorithms for computing outer inverses. J Comput Appl Math. 2014;263:236–245.
- Stanimirović PS, Ćirić M, Stojanović I, et al. Conditions for existence, representations and computation of matrix generalized inverses. Complexity. 2017:Article ID 6429725, 27 pages. doi:10.1155/2017/6429725
- Stanimirović PS, Cvetković-Ilić DS, Miljković S, et al. Full-rank representations of {2,4}, {2,3}-inverses and successive matrix squaring algorithm. Appl Math Comput. 2011;217:9358–9367.
- Tasić MB, Stanimirović PS, Petković MD. Symbolic computation of weighted Moore–Penrose inverse using partitioning method. Appl Math Comput. 2007;189:615–640.
- Urquhart NS. Computation of generalized inverse matrices which satisfy specified conditions. SIAM Rev. 1968;10:216–218.
- Urquhart NS. The nature of the lack of uniqueness of generalized inverse matrices. SIAM Rev. 1969;11(2):268–271.
- Tian Y. Some rank equalities and inequalities for Kronecker products of matrices. Linear Multilinear Algebra. 2005;53(6):445–454.
- Kaplansky I. Rings and fields. 2nd ed. Chicago: The University of Chicago Press; 1972. (Chicago lectures in mathematics series).
- Werner HJ. When is B−A− a generalized inverse of AB? Linear Algebra Appl. 1994;210:255–263.
- Caravantes J, Sendra JR, Sevilla D, et al. On the existence of birational surjective parametrizations of affine surfaces. J Algebra. 2018;501:206–214.