2007
DOI: 10.1016/j.nuclphysb.2006.12.009
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Tachyon condensation on the elliptic curve

Abstract: We use the framework of matrix factorizations to study topological B-type Dbranes on the cubic curve. Specifically, we elucidate how the brane RR charges are encoded in the matrix factors, by analyzing their structure in terms of sections of vector bundles in conjunction with equivariant R-symmetry. One particular advantage of matrix factorizations is that explicit moduli dependence is built in, thus giving us full control over the open-string moduli space. It allows one to study phenomena like discontinuous j… Show more

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Cited by 25 publications
(93 citation statements)
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References 41 publications
(160 reference statements)
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“…This matrix factorization does not depend on any open-string moduli, but it arises in the limit where the 3 × 3 factorization (4.4) becomes singular as one of the open-string parameters, α , approaches zero [17]. The U(1) R-symmetry representation (2.10) is given by 15) and the resulting three equivariant representations read 16) which label the branes, X a , in their equivariant orbit.…”
Section: Matrix Factorizations Of the Cubic Torusmentioning
confidence: 99%
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“…This matrix factorization does not depend on any open-string moduli, but it arises in the limit where the 3 × 3 factorization (4.4) becomes singular as one of the open-string parameters, α , approaches zero [17]. The U(1) R-symmetry representation (2.10) is given by 15) and the resulting three equivariant representations read 16) which label the branes, X a , in their equivariant orbit.…”
Section: Matrix Factorizations Of the Cubic Torusmentioning
confidence: 99%
“…This means we need to add to the data of the brane, P , a Z d representation, R P , such that the matrix, Q P , fulfills the equivariance condition [11,33,17]:…”
Section: Equivariant Matrix Factorizationsmentioning
confidence: 99%
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