Add to ORKGAbstract Vincent Lafforgue’s bivariant K-theory for Banach algebras is invariant in the second variable under a rather general notion of Morita equivalence. In particular, the ordinary topological K-theory for Banach algebras is invariant under Morita equivalences
AbstractWe study the Morita equivalence for fermion theories on noncommutative two-tori. For rationa...
A bordism invariance property in bivariant K-theory for unbounded Hilbert modules is proved. Various...
Properties preserved under Morita equivalence of C*-algebras We show that important structural prope...
AbstractWe develop a theory for Morita equivalence of Banach algebras with bounded approximate ident...
Abstract. We discuss that some Banach space-like properties in C∗-algebras are preserved under Morit...
Abstract. These notes, prepared for a minicourse given in Swisk, the Sedano Winter School on K-theor...
AbstractWe develop a theory for Morita equivalence of Banach algebras with bounded approximate ident...
For a Banach algebra, one can define two kinds of K-theory: topological K-theory, which satisfies Bo...
We show that important structural properties of C*-algebras and the multiplicity numbers of represen...
We review Morita equivalence for finite type k-algebras A and also a weakening of Morita equivalence...
AbstractAlgebraic theories are called Morita equivalent provided that the corresponding varieties of...
textabstractWe relate Morita equivalence for von Neumann algebras to the ``Connes fusion'' tensor pr...
Abstract. Since 2005 a new powerful invariant of an algebra emerged using earlier work of Horváth, ...
Our objective is two fold. First, we want to develop a notion of Morita equivalence for C-correspond...
Abstract. Since 2005 a new powerful invariant of an algebra emerged using earlier work of Horváth, ...
AbstractWe study the Morita equivalence for fermion theories on noncommutative two-tori. For rationa...
A bordism invariance property in bivariant K-theory for unbounded Hilbert modules is proved. Various...
Properties preserved under Morita equivalence of C*-algebras We show that important structural prope...
AbstractWe develop a theory for Morita equivalence of Banach algebras with bounded approximate ident...
Abstract. We discuss that some Banach space-like properties in C∗-algebras are preserved under Morit...
Abstract. These notes, prepared for a minicourse given in Swisk, the Sedano Winter School on K-theor...
AbstractWe develop a theory for Morita equivalence of Banach algebras with bounded approximate ident...
For a Banach algebra, one can define two kinds of K-theory: topological K-theory, which satisfies Bo...
We show that important structural properties of C*-algebras and the multiplicity numbers of represen...
We review Morita equivalence for finite type k-algebras A and also a weakening of Morita equivalence...
AbstractAlgebraic theories are called Morita equivalent provided that the corresponding varieties of...
textabstractWe relate Morita equivalence for von Neumann algebras to the ``Connes fusion'' tensor pr...
Abstract. Since 2005 a new powerful invariant of an algebra emerged using earlier work of Horváth, ...
Our objective is two fold. First, we want to develop a notion of Morita equivalence for C-correspond...
Abstract. Since 2005 a new powerful invariant of an algebra emerged using earlier work of Horváth, ...
AbstractWe study the Morita equivalence for fermion theories on noncommutative two-tori. For rationa...
A bordism invariance property in bivariant K-theory for unbounded Hilbert modules is proved. Various...
Properties preserved under Morita equivalence of C*-algebras We show that important structural prope...