矩阵方程A^m=J的某些解  

On Some Solutions to Matrix Equation A^m = J

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作  者:王天明[1] 王军[1] 

机构地区:[1]大连理工大学应用数学研究所

出  处:《大连理工大学学报》1990年第6期621-624,630,共5页Journal of Dalian University of Technology

摘  要:如果一个(0.l)g-循环矩阵的阶为ckm,行和为ck且其 Hall多项式被Tc(x)Tc(xcn)……Tc(xc(k-1)m)整除,其中m,k为正整数.c为大于1的整数,Tc(x)=1=x=……x(c-2),则它满足方程Am=J,称之为这个方程的(c,k)-型解。本文用归纳法给出了某些(c,x)一型解的构造,并通过计算(c,k)-型解的秩.证明了方程Am=J的不同型的解是不同构。最后,证明了方程Am=J的所有(c,1)-型解部是同构的.If a (0, 1) g-circulant with the sum of its rows Ok is of order C^km, whose Hall-polynomial is divisible by Tc(x) Tc(xcm) ...Tc(xc(k-1)m), then it satisfies the matrix equation A^m=J, and is called a (c, k) -type solution to the equation, where m, k and c are positive integers with 0>1, Tc(x)=1+x+…+xc-1. Some (C, k)-tgpe solutions to the equation are constructed by induction. It is shown by calculating the ranks of (c, k)-type solutions, that solutions to the equation which are of different types are not isomorphic to each others Furthermore, all the (c, 1)-type solutions are mutually isomorphic.

关 键 词:矩阵方程 G-循环矩阵 HALL多项式 

分 类 号:O151.21[理学—数学]

 

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