Add to ORKGThe investigation is concerned with operator algebras. The aim of the investigation is to obtain the required and sufficient conditions of reversibility of elements from C"*01*-algebras produced by operators of a local type and their automorphisms. The methods of a theory of C"*01*-algebras and their presentations, theories of groups, theories of dynamic systems have been used. C"*01*-variant of the theory of operators of a local type and local method has been constructed. A local-trajectory method of investigating reversibility of elements from C"*01*-algebras produced by operators of a local typeand their automorphisms has been obtained. The results obtained can be used in the studies of the theory of dynamic systems, ...
© 2020, Allerton Press, Inc. In the paper, we apply the notion of local group in the context of oper...
AbstractLet H and K be symmetric linear operators on a C∗-algebra U with domains D(H) and D(K). H is...
A spatial theory is developed for * - derivations of an algebra of unbounded operators, in terms of ...
Abstract. A not necessarily continuous, linear or multiplicative function θ from an algebra A into i...
this paper we discuss the bounded automorphisms of these algebras. In many cases we are able to conc...
In the present paper we prove that every local and 2-local derivation on conservative algebras of 2-...
AbstractA not necessarily continuous, linear or multiplicative function θ from an algebra A into its...
Abstract. A not necessarily continuous, linear or multiplicative function θ from an algebra A into i...
Vita.Local derivations and automorphisms on operator algebras have been investigated in recent paper...
We establish the algebraic re exivity of three isometry groups of operator structures: The group o...
Abstract. We prove that every local automorphism (affine 1-local, or non-affine 2-local) of the sets...
The authors study crossed products of arbitrary operator algebras by locally compact groups of compl...
© 2016, Springer Science+Business Media New York.The paper provides a short overview of a series of ...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
AbstractLet X be an infinite-dimensional separable real or complex Banach space and A a closed stand...
© 2020, Allerton Press, Inc. In the paper, we apply the notion of local group in the context of oper...
AbstractLet H and K be symmetric linear operators on a C∗-algebra U with domains D(H) and D(K). H is...
A spatial theory is developed for * - derivations of an algebra of unbounded operators, in terms of ...
Abstract. A not necessarily continuous, linear or multiplicative function θ from an algebra A into i...
this paper we discuss the bounded automorphisms of these algebras. In many cases we are able to conc...
In the present paper we prove that every local and 2-local derivation on conservative algebras of 2-...
AbstractA not necessarily continuous, linear or multiplicative function θ from an algebra A into its...
Abstract. A not necessarily continuous, linear or multiplicative function θ from an algebra A into i...
Vita.Local derivations and automorphisms on operator algebras have been investigated in recent paper...
We establish the algebraic re exivity of three isometry groups of operator structures: The group o...
Abstract. We prove that every local automorphism (affine 1-local, or non-affine 2-local) of the sets...
The authors study crossed products of arbitrary operator algebras by locally compact groups of compl...
© 2016, Springer Science+Business Media New York.The paper provides a short overview of a series of ...
In 2015, E. Katsoulis and C. Ramsey introduced the construction of a non-self-adjoint crossed produc...
AbstractLet X be an infinite-dimensional separable real or complex Banach space and A a closed stand...
© 2020, Allerton Press, Inc. In the paper, we apply the notion of local group in the context of oper...
AbstractLet H and K be symmetric linear operators on a C∗-algebra U with domains D(H) and D(K). H is...
A spatial theory is developed for * - derivations of an algebra of unbounded operators, in terms of ...