• STUDY ON SOME PROPERTIES OF SKEW-SYMMETRIC AND SKEW-CIRCULANT MATRIX OVER SKEW FIELD
Abstract
In this paper, some properties of skew-symmetric and skew-circulant matrix were extended from general complex domain to skew field. The relationships between skew-symmetric and skew-circulant matrix and symmetric circulant matrix, symmetric and skew-circulant matrix and skew-circulant matrix, over skew field, were obtained. Meanwhile, the linear expression of skew-symmetric and skew-circulant matrix under fundamental skew-circulant matrix was also obtained. In addition, over skew field, the sufficient condition, which could infer that one matrix was skew-symmetric and skew-circulant matrix and that skew-symmetric and skew-circulant matrices were commutative, as well as some properties of inverse matrix of skew-symmetric and skew-circulant matrix were acquired
Keywords
Skew-symmetric and Skew-circulant Matrix; Symmetric and Skew-circulant Matrix; Skew-circulant Matrix.
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