JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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On Rank Subtractivity Between Normal Matrices


	Authors:	Jorma K. Merikoski, Xiaoji Liu,
	Keywords:	Rank subtractivity, Minus partial ordering, Star partial ordering, Sharp partial ordering, Normal matrices, EP matrices.
	Date Received:	13/07/2007
	Date Accepted:	05/02/2008
	Subject Codes:	15A45, 15A18.
	Editors:	Fuzhen Zhang,


	Abstract:	The rank subtractivity partial ordering is defined on $mathbb{C}^{ntimes n}$ () by $mathbf{A}leq^-mathbf{B} Leftrightarrow {mathrm{rank}}(mathbf{B}-mathbf{A}) = {mathrm{rank}}mathbf{B}-{mathrm{rank}}mathbf{A}$ , and the star partial ordering by $mathbf{A}le^mathbf{B}Leftrightarrow mathbf{A}^mathbf{A} = mathbf{A}^mathbf{B} mathrel{land}mathbf{A}mathbf{A}^ = mathbf{B}mathbf{A}^*$ . If and are normal, we characterize $mathbf{A}leq^-mathbf{B}$ . We also show that then $mathbf{A}leq^-mathbf{B}mathrel{land}mathbf{AB}= mathbf{BA} Leftrightar... ...arrow mathbf{A} leq^-mathbf{B} mathrel{land}mathbf{A}^2leq^-mathbf{B}^2$ . Finally, we remark that some of our results follow from well-known results on EP matrices. ;

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