AbstractLet Δ ϵ Cnxn be an Hermitian positive definite matrix. We propose algorithms for the numerical computation of a Δ-orthonormal basis of a subspace of Cn and of its Δ-orthonormal complement
We use unitary operators in a finite von Neumann algebra as orthonormal basis for certain Hilbert sp...
In matrix computations, such as in factoring matrices, Hermitian and, preferably, positive definite ...
SRRIT is a FORTRAN program to calculate an approximate orthonormal basis for a dominant invariant su...
AbstractLet Δ ϵ Cnxn be an Hermitian positive definite matrix. We propose algorithms for the numeric...
A highly regarded method to obtain an orthonormal basis, $Z$, for the null space of a matrix $A^{T}...
In this paper, we discuss the so-called Witt basis in a Clffiord algebra and we axiomatically define...
In this paper, we consider a nonlinear matrix equation. We propose necessary and sufficient conditio...
Let A be any n×n positive definite matrix and B any n×n non-negative definite matrix. In anearlier p...
AbstractThis paper is devoted to further development of the method studying the condition numbers fo...
AbstractConsider the nonlinear matrix equation X−A*X−2A=I, where A is an n×n complex matrix, I the i...
AbstractSuppose that {ek} is an orthonormal basis for a separable, infinite-dimensional Hilbert spac...
AbstractLet A and B be n-by-n Hermitian matrices over the complex field. A result of Au-Yeung [1] an...
AbstractWe construct and study orthogonal bases of generalized polynomials on the space of Hermitian...
AbstractA simple representation of the general rank-constrained Hermitian nonnegative-definite (posi...
Consider the nonlinear matrix equation X-A*X(-2)A = I, where A is an n x n complex matrix, I the ide...
We use unitary operators in a finite von Neumann algebra as orthonormal basis for certain Hilbert sp...
In matrix computations, such as in factoring matrices, Hermitian and, preferably, positive definite ...
SRRIT is a FORTRAN program to calculate an approximate orthonormal basis for a dominant invariant su...
AbstractLet Δ ϵ Cnxn be an Hermitian positive definite matrix. We propose algorithms for the numeric...
A highly regarded method to obtain an orthonormal basis, $Z$, for the null space of a matrix $A^{T}...
In this paper, we discuss the so-called Witt basis in a Clffiord algebra and we axiomatically define...
In this paper, we consider a nonlinear matrix equation. We propose necessary and sufficient conditio...
Let A be any n×n positive definite matrix and B any n×n non-negative definite matrix. In anearlier p...
AbstractThis paper is devoted to further development of the method studying the condition numbers fo...
AbstractConsider the nonlinear matrix equation X−A*X−2A=I, where A is an n×n complex matrix, I the i...
AbstractSuppose that {ek} is an orthonormal basis for a separable, infinite-dimensional Hilbert spac...
AbstractLet A and B be n-by-n Hermitian matrices over the complex field. A result of Au-Yeung [1] an...
AbstractWe construct and study orthogonal bases of generalized polynomials on the space of Hermitian...
AbstractA simple representation of the general rank-constrained Hermitian nonnegative-definite (posi...
Consider the nonlinear matrix equation X-A*X(-2)A = I, where A is an n x n complex matrix, I the ide...
We use unitary operators in a finite von Neumann algebra as orthonormal basis for certain Hilbert sp...
In matrix computations, such as in factoring matrices, Hermitian and, preferably, positive definite ...
SRRIT is a FORTRAN program to calculate an approximate orthonormal basis for a dominant invariant su...