Twisted Bundles on Noncommutative $T^4$ and D-brane Bound States

A. Connes; A. Giveon; A. Hashimoto; A. Hashimoto; A. Konechny; A. Konechny; A. Schwarz; A. Strominger; Bum-Hoon Lee; C. Hofman; C. Hofman; Chang-Yeong Lee; D. Bigatti; D. Brace; D. Brace; D. Brace; E. Witten; E. Witten; Eunsang Kim; F. Ardalan; G. Landi; G. ’t Hooft; G. ’t Hooft; Hoil Kim; Hyun Seok Yang; J. A. Harvey; J. M. Maldacena; J. Polchinski; K. Hori; K. Intriligator; M. Bershadsky; M. Green; M. Kato; M. M. Sheikh-Jabbari; M. R. Douglas; M. Rieffel; M. S. Costa; M. S. Costa; N. Kim; N. Nekrasov; N. Seiberg; Nakwoo Kim; P. van Baal; P.-M. Ho; P.-M. Ho; P.-M. Ho; R. Casalbuoni; S. Sedlacek; T. Banks; T. Kawano; Y.-K. E. Cheung; Y.-K. E. Cheung; Z. Guralnik; Z. Guralnik

research

Twisted Bundles on Noncommutative $T^4$ and D-brane Bound States

Abstract

We construct twisted quantum bundles and adjoint sections on noncommutative

T^4

, and investigate relevant D-brane bound states with non-Abelian backgrounds. We also show that the noncommutative

T^4

with non-Abelian backgrounds exhibits SO

(4,4|Z)

duality and via this duality we get a Morita equivalent

T^4

on which only D0-branes exist. For a reducible non-Abelian background, the moduli space of D-brane bound states in Type II string theory takes the form

\prod_a (T^4)^{q_a}/S_{q_a}

.Comment: 19 pages, Latex. v2: Title is changed. Minor corrections. A reference adde

Similar works

Full text

Available Versions

Crossref

Last time updated on 02/01/2020

Twisted Bundles on Noncommutative T4T^4T4 and D-brane Bound States

Abstract

Similar works

Full text

Available Versions

Crossref

Twisted Bundles on Noncommutative $T^4$ and D-brane Bound States