Add to ORKGThe notion of spectral invariance of a locally convex ∗-algebra is defined by constructing the enveloping C∗-algebra and is characterized. It is shown that the spectral invariance induces K-theory isomorphism at a general level. As an application the differential structure of C∗-algebras is studied
A powerful tool in the spectral theory and the study of Fred-holm conditions for (pseudo)differentia...
In index theory and in noncommutative geometry one often associates C∗-algebras with geometric objec...
If A_0 is a C∗-normed algebra and τ a locally convex topology on A_0 making its multiplication sepa...
AbstractA considerable number of non-normed topological ∗-algebras admit a C∗-enveloping algebra. Va...
AbstractUsing an appropriate notion of locally convex Kasparov modules, we show how to induce isomor...
AbstractThe classical transitivity theorem of R. Kadison for C∗-algebras is here extended to the cas...
A considerable number of non-normed topological *-algebras admit a C*-enveloping algeb...
This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its c...
AbstractThis paper is concerned with the algebraic K-theory of locally convex C-algebras stabilized ...
Abstract. These notes, prepared for a minicourse given in Swisk, the Sedano Winter School on K-theor...
We present a definition of spectral flow for any norm closed ideal J in any von Neumann algebra N. G...
Twisted cyclic theory, equivariant KK-theory and KMS states Given a C-algebra A with a KMS weight fo...
Given a C*-algebra A with a KMS weight for a circle action, we construct and compute a secondary inv...
AbstractThe C∗-algebra qC is the smallest of the C∗-algebras qA introduced by Cuntz [J. Cuntz, A new...
The notion of bounded element of C*-inductive locally convex spaces (or C*- inductive partial *-alge...
A powerful tool in the spectral theory and the study of Fred-holm conditions for (pseudo)differentia...
In index theory and in noncommutative geometry one often associates C∗-algebras with geometric objec...
If A_0 is a C∗-normed algebra and τ a locally convex topology on A_0 making its multiplication sepa...
AbstractA considerable number of non-normed topological ∗-algebras admit a C∗-enveloping algebra. Va...
AbstractUsing an appropriate notion of locally convex Kasparov modules, we show how to induce isomor...
AbstractThe classical transitivity theorem of R. Kadison for C∗-algebras is here extended to the cas...
A considerable number of non-normed topological *-algebras admit a C*-enveloping algeb...
This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its c...
AbstractThis paper is concerned with the algebraic K-theory of locally convex C-algebras stabilized ...
Abstract. These notes, prepared for a minicourse given in Swisk, the Sedano Winter School on K-theor...
We present a definition of spectral flow for any norm closed ideal J in any von Neumann algebra N. G...
Twisted cyclic theory, equivariant KK-theory and KMS states Given a C-algebra A with a KMS weight fo...
Given a C*-algebra A with a KMS weight for a circle action, we construct and compute a secondary inv...
AbstractThe C∗-algebra qC is the smallest of the C∗-algebras qA introduced by Cuntz [J. Cuntz, A new...
The notion of bounded element of C*-inductive locally convex spaces (or C*- inductive partial *-alge...
A powerful tool in the spectral theory and the study of Fred-holm conditions for (pseudo)differentia...
In index theory and in noncommutative geometry one often associates C∗-algebras with geometric objec...
If A_0 is a C∗-normed algebra and τ a locally convex topology on A_0 making its multiplication sepa...