Twisted brane charges for non-simply connected groups

Gaberdiel, Matthias R.; Gannon, Terry

doi:10.1088/1126-6708/2007/01/035

Cited by 5 publications

(16 citation statements)

References 31 publications

(108 reference statements)

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“…The final result that, when h = 3, the twisted K-groups in both even and odd degree are (Z/3) 3 was obtained previously in [32, (2.20)] from the physics perspective of D-brane charges in WZW theories for PSU (3). More complicated calculations for PSU (9), where the result is not so simple, appear in [33].…”

Section: Twisted K-theory Of Compact Simple Lie Groupssupporting

confidence: 54%

“…Remark The final result that, when

h = 3

, the twisted

K

‐groups in both even and odd degree are

{false(double-struckZ / 3 false)}^{3}

was obtained previously in [, (2.20)] from the physics perspective of D‐brane charges in WZW theories for

PSU (3)

. More complicated calculations for

PSU (9)

, where the result is not so simple, appear in . Theorem actually proves more: if

h = 3 k

with

k

odd and relatively prime to 3, then

K^{•} false(H, h false) ≅ {(Z / 3)}^{3} \oplus false(double-struckZ / k false)

, and if

h = 3 k

with

k

even and relatively prime to 3, then

K^{•} false(H, h false) ≅ {(Z / 3)}^{3} \oplus false(double-struckZ / (k / 2) false)

.…”

Section: Langlands Duality and The Twisted K‐theory Of Simple Compactmentioning

confidence: 71%

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Group dualities, T‐dualities, and twisted K‐theory

Mathai

Rosenberg

2017

J. London Math. Soc.

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Abstract. This paper explores further the connection between Langlands duality and T-duality for compact simple Lie groups, which appeared in work of Daenzer-Van Erp and Bunke-Nikolaus. We show that Langlands duality gives rise to isomorphisms of twisted K-groups, but that these K-groups are trivial except in the simplest case of SU(2) and SO(3). Along the way we compute explicitly the map on H 3 induced by a covering of compact simple Lie groups, which is either 1 or 2 depending in a complicated way on the type of the groups involved. We also give a new method for computing twisted K-theory using the Segal spectral sequence, which is better adapted to many problems involving compact groups. Finally we study a duality for orientifolds based on complex Lie groups with an involution.

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Section: Twisted K-theory Of Compact Simple Lie Groupssupporting

confidence: 54%

“…Remark The final result that, when

h = 3

, the twisted

K

‐groups in both even and odd degree are

{false(double-struckZ / 3 false)}^{3}

was obtained previously in [, (2.20)] from the physics perspective of D‐brane charges in WZW theories for

PSU (3)

. More complicated calculations for

PSU (9)

, where the result is not so simple, appear in . Theorem actually proves more: if

h = 3 k

with

k

odd and relatively prime to 3, then

K^{•} false(H, h false) ≅ {(Z / 3)}^{3} \oplus false(double-struckZ / k false)

, and if

h = 3 k

with

k

even and relatively prime to 3, then

K^{•} false(H, h false) ≅ {(Z / 3)}^{3} \oplus false(double-struckZ / (k / 2) false)

.…”

Section: Langlands Duality and The Twisted K‐theory Of Simple Compactmentioning

confidence: 71%

Group dualities, T‐dualities, and twisted K‐theory

Mathai

Rosenberg

2017

J. London Math. Soc.

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“…However, in this description both integrality and nonnegativity are highly unobvious. Using the fixed-point factorisation of [48], [43] found a relatively simple expression (given below) for some of these coefficients, and from this could prove integrality, but nonnegativity remained out of reach. In Theorem 3 below, we use this to find a simple global description for the Ver k (G n )-module structure, making its relation to K-homology more evident, and allowing us to finally prove nonnegativity and establish the nimrep property.…”

Section: Compact Lie Groupsmentioning

confidence: 99%

“…To prove this, first derive (5.9), which follows straightforwardly from (5.7). The expressions for the coefficients of N (n,k,d) is much more difficult, but the Appendix of [43] uses the fixed-point factorisation of [48] to compute Since these two Ver k (G n )-modules have identical formulas for multiplication by the fundamental weights Λ m , which generate Ver k (G n ), they are isomorphic as Ver k (G n )modules, and in fact N λ = N (n,k,d) λ for all λ ∈ P k + (G n ). Therefore the coefficients of N (n,k,d) are nonnegative integers, and so N = N (n,k,d) is indeed a nimrep compatible with Z J n .…”

Section: Compact Lie Groupsmentioning

confidence: 99%

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Modular Invariants and Twisted EquivariantK-theory II: Dynkin diagram symmetries

Evans¹,

Gannon²

2013

J K-Theor

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The most basic structure of chiral conformal field theory (CFT) is the Verlinde ring. Freed-Hopkins-Teleman have expressed the Verlinde ring for the CFT's associated to loop groups, as twisted equivariant K-theory. We build on their work to express K-theoretically the structures of full CFT. In particular, the modular invariant partition functions (which essentially parametrise the possible full CFTs) have a rich interpretation within von Neumann algebras (subfactors), which has led to the developments of structures of full CFT such as the full system (fusion ring of defect lines), nimrep (cylindrical partition function), alpha-induction etc. Modular categorical interpretations for these have followed. For the generic families of modular invariants (i.e. those associated to Dynkin diagram symmetries), we provide a K-theoretic framework for these other CFT structures, and show how they relate to D-brane charges and charge-groups. We also study conformal embeddings and the E 7 modular invariant of SU(2), as well as some families of finite group doubles. This new K-theoretic framework allows us to simplify and extend the less transparent, more ad hoc descriptions of these structures obtained previously within CFT.

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Fixed Point Factorization

Beltaos

2013

Lie Theory and Its Applications in Physics

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Twisted brane charges for non-simply connected groups

Cited by 5 publications

References 31 publications

Group dualities, T‐dualities, and twisted K‐theory

Group dualities, T‐dualities, and twisted K‐theory

Modular Invariants and Twisted EquivariantK-theory II: Dynkin diagram symmetries

Fixed Point Factorization

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