AbstractIn this paper some new results on analytic domination of operators and on integrability of Lie algebras of operators are proved and then our methods are applied to the study of Lie algebras of unbounded derivations in C∗ algebras
AbstractAny derivation of a properly infinite von Neumann algebra on a Hilbert space into the algebr...
AbstractThe utilization of DF-spaces of A. Grothendieck leads to natural topologies on ∗-algebras of...
An intriguing feature which is often present in theorems regardingthe exponentiation of Lie algebras...
AbstractIn this paper some new results on analytic domination of operators and on integrability of L...
AbstractWe consider the integrability problem for Lie algebras of (generally unbounded) operators in...
AbstractIn this paper we apply the theory of second-order partial differential operators with nonneg...
AbstractWe consider operator algebras on an indefinite inner product space, which are induced by ∗-d...
AbstractA topology, based essentially on order properties, is defined on ∗-algebras of unbounded ope...
AbstractLet (∥dU(x1St∥⩽c/t12, 0 < ⩽ 1) denote a continuous representation U of a Lie group G acting ...
AbstractWe give two integrability criteria for representations of Banach–Lie algebras as skew-symmet...
AbstractUnbounded derivations in uniformly hyperfinite C∗-algebras will be studied. Various conditio...
AbstractLet C(H) denote the C∗-algebra of all compact linear operators on a complex Hilbert space H....
This work is essentially a detailed version of notes published by the author (some in collaboration)...
Abstract. We prove a number of results on integrability and extendability of Lie algebras of unbound...
AbstractLet D be a Lie derivation on a unital complex Banach algebra A. Then for every primitive ide...
AbstractAny derivation of a properly infinite von Neumann algebra on a Hilbert space into the algebr...
AbstractThe utilization of DF-spaces of A. Grothendieck leads to natural topologies on ∗-algebras of...
An intriguing feature which is often present in theorems regardingthe exponentiation of Lie algebras...
AbstractIn this paper some new results on analytic domination of operators and on integrability of L...
AbstractWe consider the integrability problem for Lie algebras of (generally unbounded) operators in...
AbstractIn this paper we apply the theory of second-order partial differential operators with nonneg...
AbstractWe consider operator algebras on an indefinite inner product space, which are induced by ∗-d...
AbstractA topology, based essentially on order properties, is defined on ∗-algebras of unbounded ope...
AbstractLet (∥dU(x1St∥⩽c/t12, 0 < ⩽ 1) denote a continuous representation U of a Lie group G acting ...
AbstractWe give two integrability criteria for representations of Banach–Lie algebras as skew-symmet...
AbstractUnbounded derivations in uniformly hyperfinite C∗-algebras will be studied. Various conditio...
AbstractLet C(H) denote the C∗-algebra of all compact linear operators on a complex Hilbert space H....
This work is essentially a detailed version of notes published by the author (some in collaboration)...
Abstract. We prove a number of results on integrability and extendability of Lie algebras of unbound...
AbstractLet D be a Lie derivation on a unital complex Banach algebra A. Then for every primitive ide...
AbstractAny derivation of a properly infinite von Neumann algebra on a Hilbert space into the algebr...
AbstractThe utilization of DF-spaces of A. Grothendieck leads to natural topologies on ∗-algebras of...
An intriguing feature which is often present in theorems regardingthe exponentiation of Lie algebras...
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