讨论了复数矩阵的数据结构和共轭转置运算的算法实现,并给出该算法的时间复杂度。
The paper deals with the data structure of plural matrix and the achievement of method about associate operation, and gives its complex degree of time.
并且给出了立体阵的转置矩阵的定义,得到了立体阵的转置矩阵和共轭矩阵的定义和性质。
The definition of the transposed matrices is given, and gotten some properties of the transposed matrices and the conjugated matrices.
利用四元数矩阵的加权共轭转置定义了四元数矩阵的加权左(右)序,给出了加权左(右) 序的一些等价刻画,推广了以往文献的相应结果。
The weighted right (left) star partial ordering is defined though the weighted conjugate of the matrix , some characterisation of its is obtained, the existed results are extended.
利用四元数矩阵的加权共轭转置定义了四元数矩阵的加权左(右)序,给出了加权左(右) 序的一些等价刻画,推广了以往文献的相应结果。
The weighted right (left) star partial ordering is defined though the weighted conjugate of the matrix , some characterisation of its is obtained, the existed results are extended.
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