Add to ORKGIn this dissertation the original results in matrix theory and general inverses theory in finite-dimensional indefinite inner product spaces are presented. Linear relations are used for the extension of some results in degenerate case. In the first part a generalization of the notion of normality and hyponormality is established.Quasihyponormal and strongly quasihyponormal matrices and linear relations are defined in nondegenerate and degenerate indefinite inner product spaces. A characterization of quasihyponormal and strongly quasihyponormal matrices in those spaces is given. In the second part a Moore-Penrose inverse of matrices and linear relations in degenerate indefinite inner product spaces is defined. Some properties of ...
Abstract. Polynomially normal matrices in real indefinite inner product spaces are studied, i.e., ma...
It is shown that, for any given polynomially normal matrix with respect to an indefinite inner produ...
AbstractSeveral classes of polar decompositions of real and complex matrices with respect to a given...
summary:In this paper we study $J$-EP matrices, as a generalization of EP-matrices in indefinite inn...
Abstract. The aim of this article is to investigate nonnegativity of the inverse, the Moore-Penrose ...
summary:In this paper we study $J$-EP matrices, as a generalization of EP-matrices in indefinite inn...
summary:In this paper we study $J$-EP matrices, as a generalization of EP-matrices in indefinite inn...
Complex matrices that are structured with respect to a possibly degenerate indef-inite inner product...
AbstractWe study classes of matrices defined by various normality properties with respect to an inde...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Thesis (PhD (Mathematics))--North-West University, Potchefstroom Campus, 2012The (definite) inner pr...
We study classes of matrices defined by various normality properties with respect to an indefinite (...
Abstract. Polynomially normal matrices in real indefinite inner product spaces are studied, i.e., ma...
It is shown that, for any given polynomially normal matrix with respect to an indefinite inner produ...
AbstractSeveral classes of polar decompositions of real and complex matrices with respect to a given...
summary:In this paper we study $J$-EP matrices, as a generalization of EP-matrices in indefinite inn...
Abstract. The aim of this article is to investigate nonnegativity of the inverse, the Moore-Penrose ...
summary:In this paper we study $J$-EP matrices, as a generalization of EP-matrices in indefinite inn...
summary:In this paper we study $J$-EP matrices, as a generalization of EP-matrices in indefinite inn...
Complex matrices that are structured with respect to a possibly degenerate indef-inite inner product...
AbstractWe study classes of matrices defined by various normality properties with respect to an inde...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Complex matrices that are structured with respect to a possibly degenerate indefinite inner product ...
Thesis (PhD (Mathematics))--North-West University, Potchefstroom Campus, 2012The (definite) inner pr...
We study classes of matrices defined by various normality properties with respect to an indefinite (...
Abstract. Polynomially normal matrices in real indefinite inner product spaces are studied, i.e., ma...
It is shown that, for any given polynomially normal matrix with respect to an indefinite inner produ...
AbstractSeveral classes of polar decompositions of real and complex matrices with respect to a given...