AbstractIn this paper, we study stability properties of norms on the complex numbers and on the quaternions. Our main findings are that these norms are stable if and only if they majorize the modulus function and that not all stable norms are strongly stable. Part of the paper is devoted to the standard matrix representations of the above number systems, where we show that norms on the corresponding matrix algebras are stable if and only if they are spectrally dominant. We conclude by considering proper seminorms, observing that none are stable on the complex numbers or on the quaternions
We mainly consider the real or complex operator norms for real or complex matrices on finite dimensi...
New perturbation theorems for matrices similar to Hermitian matrices are proved for a class of unita...
AbstractThis paper presents necessary and sufficient conditions for the eigenvalues of a given real ...
In this paper, we study stability properties of norms on the complex numbers and on the quaternions....
AbstractA vector norm |·|on the space of n×n complex valued matrices is called stable if for some co...
AbstractThe purpose of this survey paper is to give a brief review of certain aspects of stability o...
AbstractA norm N on an algebra A is called quadrative if N(x2) ≤ N(x)2 for all x ∈ A, and strongly s...
Let f be a real-valued function defined on a nonempty subset of an algebra over a field , either o...
A norm N on an algebra A is called quadrative if N(x^2) ≤ N(x)^2 for all x ∈ A, and strongly stable ...
A seminorm S on an algebra A is called stable if for some constant σ > 0 , S(x^k) ≤ σS(x)^k for all...
The main goal of this paper is to characterize stability and bounded-input-bounded-output (BIBO)-sta...
We provide alternate derivations of some results in numerical linear algebra based on a representati...
AbstractWe study complex-valued symmetric matrices. A simple expression for the spectral norm of suc...
AbstractThis work is concerned with estimating the lower bound of rank for a given quaternion square...
AbstractAs is well known, Clifford algebras can be faithfully realized as certain matrix algebras, t...
We mainly consider the real or complex operator norms for real or complex matrices on finite dimensi...
New perturbation theorems for matrices similar to Hermitian matrices are proved for a class of unita...
AbstractThis paper presents necessary and sufficient conditions for the eigenvalues of a given real ...
In this paper, we study stability properties of norms on the complex numbers and on the quaternions....
AbstractA vector norm |·|on the space of n×n complex valued matrices is called stable if for some co...
AbstractThe purpose of this survey paper is to give a brief review of certain aspects of stability o...
AbstractA norm N on an algebra A is called quadrative if N(x2) ≤ N(x)2 for all x ∈ A, and strongly s...
Let f be a real-valued function defined on a nonempty subset of an algebra over a field , either o...
A norm N on an algebra A is called quadrative if N(x^2) ≤ N(x)^2 for all x ∈ A, and strongly stable ...
A seminorm S on an algebra A is called stable if for some constant σ > 0 , S(x^k) ≤ σS(x)^k for all...
The main goal of this paper is to characterize stability and bounded-input-bounded-output (BIBO)-sta...
We provide alternate derivations of some results in numerical linear algebra based on a representati...
AbstractWe study complex-valued symmetric matrices. A simple expression for the spectral norm of suc...
AbstractThis work is concerned with estimating the lower bound of rank for a given quaternion square...
AbstractAs is well known, Clifford algebras can be faithfully realized as certain matrix algebras, t...
We mainly consider the real or complex operator norms for real or complex matrices on finite dimensi...
New perturbation theorems for matrices similar to Hermitian matrices are proved for a class of unita...
AbstractThis paper presents necessary and sufficient conditions for the eigenvalues of a given real ...