Kronecker product of matrices and solutions of Sylvestertype matrix polynomial equations
Анотація
We investigate the solutions of the Sylvester-type matrix polynomial equation $$A(\lambda)X(\lambda)+Y(\lambda)B(\lambda)=C(\lambda),$$ where\ $A(\lambda),$ \ $ B(\lambda),$\ and \ $C(\lambda)$ are the polynomial matrices with elements in a ring of polynomials \ $\mathcal{F}[\lambda],$ \ $\mathcal{F}$ is a field,\ $X(\lambda)$\ and \ $Y(\lambda)$ \ are unknown polynomial matrices. Solving such a matrix equation is reduced to the solving a system of linear equations
$$G \left\|\begin{array}{c}\mathbf{x} \\ \mathbf{y} \end{array} \right\|=\mathbf{c}$$ over a field $\mathcal{F}.$ In this case, the Kronecker product of matrices is applied. In terms of the ranks of matrices over a field $\mathcal{F},$ which are constructed by the coefficients of the Sylvester-type matrix polynomial equation,
the necessary and sufficient conditions for the existence of solutions \ $X_0(\lambda)$\ and \ $Y_0(\lambda)$ \ of given degrees to the Sylvester-type matrix polynomial equation are established. The solutions of this matrix polynomial equation are constructed from the solutions of the linear equations system.
As a consequence of the obtained results, we give the necessary and sufficient conditions for the existence of the scalar solutions \ $X_0$\ and \ $Y_0,$ \ whose entries are elements in a field $\mathcal{F},$ to the Sylvester-type matrix polynomial equation.
Посилання
S. Barnett, Matrices in control theory with applications to linear programming, London: Van Nostrand Reingold Company, 1971, 221 p.
T. Kaczorek, Polynomial and rational matrices. Applications in dynamical systems theory, London: Springer, 2007, 503 p.
V. Kucera, Algebraic theory of discrete optimal control for multivariable systems, Kybernetika, V.10 (1974), Suppl., 1–56.
B. Zhou, Z.-B. Yan, G.-R. Duan, Unified parametrization for the solutions to the polynomial Diophantine matrix equation and the generalized Sylvester matrix equation, Int. J. Control Autom. Syst., 8 (2010), №1, 29–35. https://doi.org/10.1007/s12555-010-0104-0.
Y. Tian, C. Xia, On the low-degree solution of the Sylvester matrix polynomial equation, Hindawi J. Math., 2021 (2021), Article ID 4612177. https://doi.org/10.1155/2021/4612177.
T. Kaczorek, Zero-degree solutions to the bilateral polynomial matrix equations, Bull. Polish Acad. Sci. Ser. Techn. Sci., 34 (1986), №9–10, 547–552.
N.S. Dzhaliuk, V.M. Petrychkovych, Solutions of the matrix linear bilateral polynomial equation and their structure, Algebra Discrete Math., 27 (2019), №2, 243–251.
S. Barnett, Regular polynomial matrices having relatively prime determinants, Math. Proc. Cambridge Philos. Soc., 65 (1969), №3, 585–590.
J. Feinstein, Y. Bar-Ness, On the uniqueness of the minimal solution to the matrix polynomial equation A(λ)X(λ) + Y (λ)B(λ) = C(λ), J. Franklin Inst., 310, (1980), №2, 131–134.
N.B. Ladzoryshyn, Integer solutions of matrix linear unilateral and bilateral equations over quadratic rings, J. Math. Sci., 223 (2017), №1, 50–59. https://doi.org/10.1007/s10958-017-3337-0.
N.B. Ladzoryshyn, V.M. Petrychkovych, Standard form of matrices over quadratic rings with respect to the (z, k)-equivalence and the structure of solutions of bilateral matrix linear equations, J. Math. Sci., 253 (2021), №1, 54–62. https://doi.org/10.1007/s10958-021-05212-w.
B. Ladzoryshyn, V.М. Petrychkovych, The number of standard forms of matrices over imaginary Euclidean quadratic rings with respect to the (z, k)-equivalence, Mat. Stud., 57 (2022), №2, 115–121.
N.B. Ladzoryshyn, V.M. Petrychkovych, H.V. Zelisko, Matrix Diophantine equations over quadratic rings and their solutions, Carpathian Math. Publ., 12 (2020), №2, 368–375. https://doi.org/10.15330/cmp.12.2.368-375
N.S. Dzhaliuk, V.M. Petrychkovych, The matrix linear unilateral and bilateral equations with two variables over commutative rings, Int. Scholarly Research Network. ISRN Algebra, 2012, Article ID 205478, 14 p. https://doi.org/10.5402/2012/205478.
Liu Yong Hui, Ranks of solutions of the linear matrix equation, Comput. Math. Appl., 52 (2006), №6–7, 861–872.
W.E. Roth, The equations AX − Y B = C and AX −XB = C in matrices , Proc. Amer. Math. Soc., 3 (1952), №3, 392–396.
P. Lancaster, M. Tismenetsky, The theory of matrices. Second ed. with appl. (Comp. Sc. and Appl. Math.), New York: Academic Press, 1985, 570 p.
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