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• [1] Amster P, Idels L. New applications of M matrix methods to stability of high-order linear delayed equations. Appl. Math. Lett. 2016;54:1-6.
• [2] Bendito E, Carmona A, Encinas AM, Mitjana M. The M matrix ınverse problem for singular and symmetric Jacobi matrices. Linear Algebra Appl. 2012;436:1090-1098.
• [3] Brandts J, Cihangir A. Geometric aspects of the symmetric ınverse M matrix problem. Linear Algebra Appl. 2016;506:33-81.
• [4] Baker CE, Mityagin BS. Location of eigenvalues of doubly cyclic matrices. Linear Algebra Appl. 2018;540:160-202.
• [5] Chandrashekaran A, Parthasarathy T, Ravindran G. On strong Z matrices. Linear Algebra Appl. 2010;432:964-969.
• [6] Guan J. Modified alternately linearized ımplicit ıteration method for M matrix algebraic Riccati equations. Appl. Math. Comput. 2019;347:442-448.
• [7] Horn RA, Johnson CR. Topics in matrix analysis. Cambridge, Cambridge University Press; 1991.
• [8] Hershkowitz D, Schneider H. On the generalized nullspace of M matrices and Z matrices. Linear Algebra Appl. 1988;106:5-23.
• [9] Hershkowitz D, Schneider H. Solution of Z matrix equations. Linear Algebra Appl. 1988;106:25-38.
• [10] Jeffries CD, Johnson CR, Zhou T, Simpson DA, Kaufmann WK. A flexible and qualitatively stable model for cell cycle dynamics ıncluding dna damage effect. Gene Regulation and Systems Biology. 2012;1:55-66.
• [11] Johnson CR, Price Z, Spitkovsky IM. The distribution of eigenvalues of doubly cyclic Z^+ matrices. Linear Algebra Appl. 2013;439:3576-3580.
• [12] Kalman D, White JE. Polynomial equation and circulant matrices. Amer. Math. Monthly. 2001;108(9):821-840.
• [13] Lu L, Ahmed Z, Guan J. Numerical methods for a quadratic matrix equation with a nonsingular M matrix. Appl.Math.Lett. 2016;52:46-52.
• [14] Li C, Zhang F. Eigenvalue continuity and Gersgorin’s Theorem. Electron. J. Linear Algebra. 2019;35:619-625.