Add to ORKGIn the 1960\u27s, Dixmier and Douady showed that continuous-trace C*-algebras can be classified up to spectral-preserving Morita equivalence. They provided a cohomology group which can track this equivalence. In 2010, an Huef, Kumjian and Sims provided a Dixmier-Douady theory for a more general class of C*-algebras, namely Fell algebras. It follows that there is a group structure on the collection of Morita-equivalence classes of Fell algebras with a given spectrum | the one pulled back from the cohomology group. For continuous-trace C*-algebras, this group structure is explicitly described by a balanced tensor product operation, and the resulting group is called the Brauer group. This thesis aims to describe a Brauer group for Fell algebra...
The Brauer algebra was introduced by R. Brauer in 1937 as a tool in invariant theory. The problem of...
The Dixmier-Douady invariant is the primary tool in the classification of continuous trace C*-algebr...
This book is devoted to arithmetic geometry with special attention given to the unramified Brauer gr...
In the 1960\u27s, Dixmier and Douady showed that continuous-trace C*-algebras can be classified up t...
There are similarities between algebraic Lie theory and a geometric description of the blocks of the...
AbstractWe generalise the Dixmier–Douady classification of continuous-trace C⁎-algebras to Fell alge...
AbstractSuppose that (G, T) is a second countable locally compact transformation group given by a ho...
AbstractWe generalise the Dixmier–Douady classification of continuous-trace C⁎-algebras to Fell alge...
This monograph provides a systematic treatment of the Brauer group of schemes, from the foundational...
Abstract. An algebra is a vector space V over a field k together with a k-bilinear product of vector...
Using profinite Galois descent, we compute the Brauer group of the $K(1)$-local category relative to...
The marked Brauer algebra is a generalization of the diagrammatic Brauer algebra which diagrammatize...
AbstractThere are similarities between algebraic Lie theory and a geometric description of the block...
Abstract. We have previously shown that the isomorphism classes of orientable locally trivial fields...
Examples of Fell algebras with compact spectrum and trivial Dixmier-Douady invariant are constructed...
The Brauer algebra was introduced by R. Brauer in 1937 as a tool in invariant theory. The problem of...
The Dixmier-Douady invariant is the primary tool in the classification of continuous trace C*-algebr...
This book is devoted to arithmetic geometry with special attention given to the unramified Brauer gr...
In the 1960\u27s, Dixmier and Douady showed that continuous-trace C*-algebras can be classified up t...
There are similarities between algebraic Lie theory and a geometric description of the blocks of the...
AbstractWe generalise the Dixmier–Douady classification of continuous-trace C⁎-algebras to Fell alge...
AbstractSuppose that (G, T) is a second countable locally compact transformation group given by a ho...
AbstractWe generalise the Dixmier–Douady classification of continuous-trace C⁎-algebras to Fell alge...
This monograph provides a systematic treatment of the Brauer group of schemes, from the foundational...
Abstract. An algebra is a vector space V over a field k together with a k-bilinear product of vector...
Using profinite Galois descent, we compute the Brauer group of the $K(1)$-local category relative to...
The marked Brauer algebra is a generalization of the diagrammatic Brauer algebra which diagrammatize...
AbstractThere are similarities between algebraic Lie theory and a geometric description of the block...
Abstract. We have previously shown that the isomorphism classes of orientable locally trivial fields...
Examples of Fell algebras with compact spectrum and trivial Dixmier-Douady invariant are constructed...
The Brauer algebra was introduced by R. Brauer in 1937 as a tool in invariant theory. The problem of...
The Dixmier-Douady invariant is the primary tool in the classification of continuous trace C*-algebr...
This book is devoted to arithmetic geometry with special attention given to the unramified Brauer gr...