Add to ORKGA new proof is obtained to the following fact: a Rickart C∗-algebra satisfies polar decomposition. Equivalently, matrix algebras over a Rickart C∗-algebra are also Rickart C∗-algebras. Introduction. In this paper we give new proof of the following result: all Rickart C∗-algebras satisfy polar decomposition. This fact was established in [2] by P. Ara and author by using a suitable factorization of the elements in the regular overring of a finite Rickart C∗-algebra
The polar decomposition of a square matrix has been generalized by several authors to scalar product...
AbstractLet A be a finite dimensional hereditary algebra over a finite field, and let C(A) be the co...
AbstractMotivated by applications in the theory of unitary congruence, we introduce the factorizatio...
A new proof is obtained to the following fact: a Rickart C*-algebra satisfies polar decomposition. E...
Rickart C∗-algebras are unital and satisfy polar decomposition. We proved that if a unital C∗-algebr...
AbstractWe present new results on the ϕJ polar decomposition of matrices. We show that every symplec...
In the paper we review the numerical methods for computing the polar decomposition of a matrix. Nume...
AbstractExplicit algebraic formulas for the polar decomposition of a nonsingular real 2×2 matrix A a...
.In the paper we review the numerical methods for computing the polar decomposition of a matrix. Num...
In this paper we give a proof for the special structure of the Wedderburn decomposition of the regul...
AbstractVarious conditions on an automorphism of a C∗-algebra are shown to be equivalent in the case...
AbstractLet L(λ) = Inλm + Am−1λm−1 + …+A1λ + A0 be an n × n monic matrix polynomial, and let CL be t...
In this paper we give a proof for the special structure of the Wedderburn decomposition of the regul...
In this paper we give a proof for the special structure of the Wedderburn decomposition of the regul...
The polar decomposition of a square matrix has been generalized by several authors to scalar product...
The polar decomposition of a square matrix has been generalized by several authors to scalar product...
AbstractLet A be a finite dimensional hereditary algebra over a finite field, and let C(A) be the co...
AbstractMotivated by applications in the theory of unitary congruence, we introduce the factorizatio...
A new proof is obtained to the following fact: a Rickart C*-algebra satisfies polar decomposition. E...
Rickart C∗-algebras are unital and satisfy polar decomposition. We proved that if a unital C∗-algebr...
AbstractWe present new results on the ϕJ polar decomposition of matrices. We show that every symplec...
In the paper we review the numerical methods for computing the polar decomposition of a matrix. Nume...
AbstractExplicit algebraic formulas for the polar decomposition of a nonsingular real 2×2 matrix A a...
.In the paper we review the numerical methods for computing the polar decomposition of a matrix. Num...
In this paper we give a proof for the special structure of the Wedderburn decomposition of the regul...
AbstractVarious conditions on an automorphism of a C∗-algebra are shown to be equivalent in the case...
AbstractLet L(λ) = Inλm + Am−1λm−1 + …+A1λ + A0 be an n × n monic matrix polynomial, and let CL be t...
In this paper we give a proof for the special structure of the Wedderburn decomposition of the regul...
In this paper we give a proof for the special structure of the Wedderburn decomposition of the regul...
The polar decomposition of a square matrix has been generalized by several authors to scalar product...
The polar decomposition of a square matrix has been generalized by several authors to scalar product...
AbstractLet A be a finite dimensional hereditary algebra over a finite field, and let C(A) be the co...
AbstractMotivated by applications in the theory of unitary congruence, we introduce the factorizatio...