Add to ORKGAbstract. Descriptions are given of multiplicative maps on complex and real matrices that leave invariant a certain function, property, or set of matrices: norms, spectrum, spectral radius, elementary symmetric functions of eigenvalues, certain functions of singular values, (p, q) numerical ranges and radii, sets of unitary, normal, or Hermitian matrices, as well as sets of Hermitian matrices with fixed inertia. The treatment of all these cases is unified, and is based on general group theoretic results concerning multiplicative maps of general and special linear groups, which in turn are based on classical results by Borel- Tits. Multiplicative maps that leave invariant elementary symmetric functions of eigenvalues and spectra are describe...
Let ø be a surjective map on the space of n x n complex matrices such that r(ø(A)-ø(B...
AbstractLet F be a field, F∗ be its multiplicative group, and H = {H:H is a subgroup of F∗ and there...
Abstract. We consider semigroups of matrices where either the diagonal map or the diagonal product m...
AbstractWe characterize multiplicative maps φ on semigroups of square matrices satisfying φ(P)⊆P for...
AbstractLet Mn denote the set of all n×n matrices over the complex numbers (n≥ 2). Let An ⊆ Mn be ei...
Let Mn denote the set of all n×n matrices over the complex numbers (n≥ 2). Let An ⊆ Mn be either the...
AbstractLet Mn be the algebra of all n×n matrices, and let φ:Mn→Mn be a linear mapping. We say that ...
Let M n be the semigroup of n × n complex matrices under the usual multiplication, and let S be diff...
AbstractThe general form of a continuous mapping φ acting on the real vector space of all n × n comp...
AbstractLet Mn be the semigroup of n×n complex matrices under the usual multiplication, and let S be...
Let M n be the algebra of all n × n matrices over a field double-struck F sign, where n ≥ 2. Let S b...
AbstractCommutativity-preserving maps on the real space of all real symmetric or complex self-adjoin...
Let $\mathcal{M}_n$ be the algebra of all $n\times n$ matrices over a field $\mathbb{F}$, where $n \...
AbstractWe characterize multiplicative maps φ on semigroups of square matrices satisfying φ(P)⊆P for...
AbstractLet n be an even integer such that n ⩾ 4. Let T be an invertible linear map on the space of ...
Let ø be a surjective map on the space of n x n complex matrices such that r(ø(A)-ø(B...
AbstractLet F be a field, F∗ be its multiplicative group, and H = {H:H is a subgroup of F∗ and there...
Abstract. We consider semigroups of matrices where either the diagonal map or the diagonal product m...
AbstractWe characterize multiplicative maps φ on semigroups of square matrices satisfying φ(P)⊆P for...
AbstractLet Mn denote the set of all n×n matrices over the complex numbers (n≥ 2). Let An ⊆ Mn be ei...
Let Mn denote the set of all n×n matrices over the complex numbers (n≥ 2). Let An ⊆ Mn be either the...
AbstractLet Mn be the algebra of all n×n matrices, and let φ:Mn→Mn be a linear mapping. We say that ...
Let M n be the semigroup of n × n complex matrices under the usual multiplication, and let S be diff...
AbstractThe general form of a continuous mapping φ acting on the real vector space of all n × n comp...
AbstractLet Mn be the semigroup of n×n complex matrices under the usual multiplication, and let S be...
Let M n be the algebra of all n × n matrices over a field double-struck F sign, where n ≥ 2. Let S b...
AbstractCommutativity-preserving maps on the real space of all real symmetric or complex self-adjoin...
Let $\mathcal{M}_n$ be the algebra of all $n\times n$ matrices over a field $\mathbb{F}$, where $n \...
AbstractWe characterize multiplicative maps φ on semigroups of square matrices satisfying φ(P)⊆P for...
AbstractLet n be an even integer such that n ⩾ 4. Let T be an invertible linear map on the space of ...
Let ø be a surjective map on the space of n x n complex matrices such that r(ø(A)-ø(B...
AbstractLet F be a field, F∗ be its multiplicative group, and H = {H:H is a subgroup of F∗ and there...
Abstract. We consider semigroups of matrices where either the diagonal map or the diagonal product m...