Chern character in twisted K theory: Equivariant and holomorphic cases
Varghese Mathai,Danny Stevenson +1 more
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In this paper, the Chern-Weil representative of the Chern character of bundle gerbe K-theory was introduced, extending the construction to the equivariant and the holomorphic cases.Abstract:
It was argued in [25, 5] that in the presence of a nontrivial B-field, D-brane charges in type IIB string theories are classified by twisted K-theory. In [4], it was proved that twisted K-theory is canonically isomorphic to bundle gerbe K-theory, whose elements are ordinary Hilbert bundles on a principal projective unitary bundle, with an action of the bundle gerbe determined by the principal projective unitary bundle. The principal projective unitary bundle is in turn determined by the twist. This paper studies in detail the Chern-Weil representative of the Chern character of bundle gerbe K-theory that was introduced in [4], extending the construction to the equivariant and the holomorphic cases. Included is a discussion of interesting examples.read more
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T-Duality: Topology Change from H -Flux
TL;DR: In this article, the first Chern class with the fiberwise integral of the H-flux is replaced by the second Chern class, which is the fiber-wise integral function of the background flux of the twisted K-theory.
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Heisenberg groups and noncommutative fluxes
TL;DR: In this article, a group-theoretical approach to the formulation of generalized abelian gauge theories, such as those appearing in string theory and M-theory, was developed.
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Twisted K theory of differentiable stacks
TL;DR: In this article, the twisted K-theory of topological spaces and twisted equivariant k-theories of orbifolds is studied in the context of groupoids, where the twisted class is given by an S 1 -gerbe over the stack.
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Some relations between twisted K-theory and e8 gauge theory
Varghese Mathai,Hisham Sati +1 more
TL;DR: In this paper, the twisted K-theory torus is constructed to define the partition function of the Ramond-Ramond fields of type IIA string theory from an E 8 gauge theory in eleven dimensions.
The basic gerbe over a compact simple Lie group
Abstract: Let $G$ be a compact, simply connected simple Lie group. We give a construction of an equivariant gerbe with connection on $G$, with equivariant 3-curvature representing a generator of $H^3_G(G,\Z)$. Technical tools developed in this context include a gluing construction for gerbes and a theory of equivariant bundle gerbes.