AbstractThe usual power method for matrices is generalized for contractions in indefinite metric spaces. This generalization unifies the power method and the inertia theorem in a natural way
summary:In this paper a natural generalization of the gradual power method, known in matrix algebra,...
Abstract. The aim of this article is to investigate nonnegativity of the inverse, the Moore-Penrose ...
AbstractWe determine the inertia of a linear real symmetric matrix pencil A(t)=A−tB of order n as a ...
AbstractThe usual power method for matrices is generalized for contractions in indefinite metric spa...
AbstractAn iterative method is described which rapidly computes the norm of a nonnegative matrix A, ...
Sylvester's law of inertia states that the number of positive, negative and zero eigenvalues of Herm...
AbstractWe survey various generalizations of matrix monotonicity. Of much interest to us are relatio...
In this talk we will study the different ways the power means of positive numbers can be extended to...
AbstractIn a recent work by Sidi and Bridger some old and some new extensions of the power method ha...
AbstractIn a recent paper in this journal, we extended Poincaré's inequalities, which compare the nu...
We study the relation between the solutions of two estimation problems with indefinite quadratic for...
C.R. Johnson and M. Lundquist proved the inertia formulae for invertible self-adjoint operator matri...
AbstractThe basic objects in this paper are monotonically nondecreasing n×n matrix functions D(·) de...
AbstractAn n-by-n sign pattern A is a matrix with entries in {+,-,0}. An n-by-n nonzero pattern A is...
We study the relation between the solutions of two minimization problems with indefinite quadratic ...
summary:In this paper a natural generalization of the gradual power method, known in matrix algebra,...
Abstract. The aim of this article is to investigate nonnegativity of the inverse, the Moore-Penrose ...
AbstractWe determine the inertia of a linear real symmetric matrix pencil A(t)=A−tB of order n as a ...
AbstractThe usual power method for matrices is generalized for contractions in indefinite metric spa...
AbstractAn iterative method is described which rapidly computes the norm of a nonnegative matrix A, ...
Sylvester's law of inertia states that the number of positive, negative and zero eigenvalues of Herm...
AbstractWe survey various generalizations of matrix monotonicity. Of much interest to us are relatio...
In this talk we will study the different ways the power means of positive numbers can be extended to...
AbstractIn a recent work by Sidi and Bridger some old and some new extensions of the power method ha...
AbstractIn a recent paper in this journal, we extended Poincaré's inequalities, which compare the nu...
We study the relation between the solutions of two estimation problems with indefinite quadratic for...
C.R. Johnson and M. Lundquist proved the inertia formulae for invertible self-adjoint operator matri...
AbstractThe basic objects in this paper are monotonically nondecreasing n×n matrix functions D(·) de...
AbstractAn n-by-n sign pattern A is a matrix with entries in {+,-,0}. An n-by-n nonzero pattern A is...
We study the relation between the solutions of two minimization problems with indefinite quadratic ...
summary:In this paper a natural generalization of the gradual power method, known in matrix algebra,...
Abstract. The aim of this article is to investigate nonnegativity of the inverse, the Moore-Penrose ...
AbstractWe determine the inertia of a linear real symmetric matrix pencil A(t)=A−tB of order n as a ...