In this paper we describe all isometries on the special orthogonal group. As an application we give a form of spectrally multiplicative map on the special orthogonal group
Computer Graphics Rotational Matrices are also Special Orthogonal. Because special orthogonal matric...
We establish the algebraic re exivity of three isometry groups of operator structures: The group o...
AbstractWe consider linear surjective isometries acting on reflexive operator algebras with commutat...
AbstractWe study isometries of certain non-self-adjoint operator algebras by means of the structure ...
AbstractThe sum of the first κ singular values of an n-square complex matrix is a norm, 1 ⩽ κ ⩽ n. I...
The subject of matrices and their applications is of great importance, for this branch of mathematic...
An operator A on a complex Hilbert space H is called a quasi-isometry if A*2 A2 = A* A. In the prese...
AbstractLet F be the field of real or complex numbers, and let G be a subgroup of the general linear...
It is proven that, for every pair {A, B} of anticommuting self-adjoint operators, iAB is essntially ...
Let $G$ be a simply connected semisimple algebraic group with Lie algebra $mathfrak g$, let $G_0 sub...
AbstractA survey of linear isometries for unitarily invariant norms on real or complex rectangular m...
AbstractLet F denote either the complex field C or the real field R. Let V be Sn(F) or Kn(F), the ve...
AbstractAny relation between simple isometries is a consequence of relations of lengths ⩽4. This ext...
We prove that unital surjective spectral isometries on certain non-simple unital C*-algebras are Jor...
AbstractThe spatial action of the Stone-type spectral family for a certain type of strongly continuo...
Computer Graphics Rotational Matrices are also Special Orthogonal. Because special orthogonal matric...
We establish the algebraic re exivity of three isometry groups of operator structures: The group o...
AbstractWe consider linear surjective isometries acting on reflexive operator algebras with commutat...
AbstractWe study isometries of certain non-self-adjoint operator algebras by means of the structure ...
AbstractThe sum of the first κ singular values of an n-square complex matrix is a norm, 1 ⩽ κ ⩽ n. I...
The subject of matrices and their applications is of great importance, for this branch of mathematic...
An operator A on a complex Hilbert space H is called a quasi-isometry if A*2 A2 = A* A. In the prese...
AbstractLet F be the field of real or complex numbers, and let G be a subgroup of the general linear...
It is proven that, for every pair {A, B} of anticommuting self-adjoint operators, iAB is essntially ...
Let $G$ be a simply connected semisimple algebraic group with Lie algebra $mathfrak g$, let $G_0 sub...
AbstractA survey of linear isometries for unitarily invariant norms on real or complex rectangular m...
AbstractLet F denote either the complex field C or the real field R. Let V be Sn(F) or Kn(F), the ve...
AbstractAny relation between simple isometries is a consequence of relations of lengths ⩽4. This ext...
We prove that unital surjective spectral isometries on certain non-simple unital C*-algebras are Jor...
AbstractThe spatial action of the Stone-type spectral family for a certain type of strongly continuo...
Computer Graphics Rotational Matrices are also Special Orthogonal. Because special orthogonal matric...
We establish the algebraic re exivity of three isometry groups of operator structures: The group o...
AbstractWe consider linear surjective isometries acting on reflexive operator algebras with commutat...
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