AbstractWe study classes of matrices defined by various normality properties with respect to an indefinite (complex) inner product. The relationships between many such properties, all of them equivalent to the normality in case of a definite inner product, are described. In particular, a “canonical form” is developed for the class of matrices that are polynomials of a self-adjoint matrix
AbstractA structural characterization is given for the class of those nonnegative matrices for which...
AbstractThe problem of the existence of a J-normal matrix A when its spectrum and the spectrum of so...
AbstractSeveral classes of polar decompositions of real and complex matrices with respect to a given...
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...
Complex matrices that are structured with respect to a possibly degenerate indef-inite inner product...
It is shown that, for any given polynomially normal matrix with respect to an indefinite inner produ...
Basic classes of matrices or linear transformations in finite dimensional quaternionic vector spaces...
Mehl, Christian. (2006), "Essential decomposition of polynomially normal matrices in real indef...
In this dissertation the original results in matrix theory and general inverses theory in finite-di...
In this paper positive real matrices in indefinite inner product spaces are studied. This class of m...
Thesis (PhD (Mathematics))--North-West University, Potchefstroom Campus, 2012The (definite) inner pr...
AbstractIn hopes that it will be useful to a wide audience, a long list of conditions on an n-by-n c...
AbstractFor selfadjoint and unitary matrices with respect to indefinite inner products on finite dim...
The different normal forms of matrices, Hermite, Smith and Jordan Normal Forms are widel
AbstractA structural characterization is given for the class of those nonnegative matrices for which...
AbstractThe problem of the existence of a J-normal matrix A when its spectrum and the spectrum of so...
AbstractSeveral classes of polar decompositions of real and complex matrices with respect to a given...
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...
Complex matrices that are structured with respect to a possibly degenerate indef-inite inner product...
It is shown that, for any given polynomially normal matrix with respect to an indefinite inner produ...
Basic classes of matrices or linear transformations in finite dimensional quaternionic vector spaces...
Mehl, Christian. (2006), "Essential decomposition of polynomially normal matrices in real indef...
In this dissertation the original results in matrix theory and general inverses theory in finite-di...
In this paper positive real matrices in indefinite inner product spaces are studied. This class of m...
Thesis (PhD (Mathematics))--North-West University, Potchefstroom Campus, 2012The (definite) inner pr...
AbstractIn hopes that it will be useful to a wide audience, a long list of conditions on an n-by-n c...
AbstractFor selfadjoint and unitary matrices with respect to indefinite inner products on finite dim...
The different normal forms of matrices, Hermite, Smith and Jordan Normal Forms are widel
AbstractA structural characterization is given for the class of those nonnegative matrices for which...
AbstractThe problem of the existence of a J-normal matrix A when its spectrum and the spectrum of so...
AbstractSeveral classes of polar decompositions of real and complex matrices with respect to a given...
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