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http://dx.doi.org/10.14317/jami.2011.29.1_2.485

INVOLUTORY AND S+1-POTENCY OF LINEAR COMBINATIONS OF A TRIPOTENT MATRIX AND AN ARBITRARY MATRIX  

Bu, Changjiang (Department of Applied Mathematics, College of Science, Harbin Engineering University)
Zhou, Yixin (Department of Applied Mathematics, College of Science, Harbin Engineering University)
Publication Information
Journal of applied mathematics & informatics / v.29, no.1_2, 2011 , pp. 485-495 More about this Journal
Abstract
Let $A_1$ and $A_2$ be $n{\times}n$ nonzero complex matrices, denote a linear combination of the two matrices by $A=c_1A_1+c_2A_2$, where $c_1$, $c_2$ are nonzero complex numbers. In this paper, we research the problem of the linear combinations in the general case. We give a sufficient and necessary condition for A is an involutive matrix and s+1-potent matrix, respectively, where $A_1$ is a tripotent matrix, with $A_1A_2=A_2A_1$. Then, using the results, we also give the sufficient and necessary conditions for the involutory of the linear combination A, where $A_1$ is a tripotent matrix, anti-idempotent matrix, and involutive matrix, respectively, and $A_2$ is a tripotent matrix, idempotent matrix, and involutive matrix, respectively, with $A_1A_2=A_2A_1$.
Keywords
Tripotent matrix; idempotent matrix; involutive matrix; s + 1-potent matrix; linear combination;
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