Gor Sarkissian scite author profile

We discuss the effect of relevant boundary terms on the nature of branes. This is done for toroidal and orbifold compactifications of the bosonic string. Using the relative minimalization of the boundary entropy as a guiding principle, we uncover the more stable boundary conditions at different regions of moduli space. In some cases, Neumann boundary conditions dominate for small radii while Dirichlet boundary conditions dominate for large radii. The c = 1 and c = 2 moduli spaces are studied in some detail. The antisymmetric background field B is found to have a more limited role in the case of Dirichlet boundary conditions. This is due to some topological considerations. The results are subjected to T -duality tests and the special role of the points in moduli space fixed under T -duality is explained from least-action considerations.

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D-branes in the background of NS fivebranes

Elitzur

Giveon

Rabinovici

et al. 2000

J. High Energy Phys.

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Symmetry breaking, permutation D-branes on group manifolds: boundary states and geometric description

Sarkissian¹,

Zamaklar²

2004

Nuclear Physics B

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We use the permutation symmetry between the product of several group manifolds in combination with orbifolds and T-duality to construct new classes of symmetry breaking branes on products of group manifolds. The resulting branes mix the submanifolds and break part of the diagonal chiral algebra of the theory. We perform a Langrangian analysis as well as a boundary CFT construction of these branes and find agreement between the two methods.

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Some remarks on defects and T-duality

Sarkissian

Schweigert

2009

Nuclear Physics B

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The equations of motion for a conformal field theory in the presence of defect lines can be derived from an action that includes contributions from bibranes. For T-dual toroidal compactifications, they imply a direct relation between Poincare line bundles and the action of T-duality on boundary conditions. We also exhibit a class of diagonal defects that induce a shift of the B-field. We finally study T-dualities for S^1-fibrations in the example of the Wess-Zumino-Witten model on SU(2) and lens spaces. Using standard techniques from D-branes, we derive from algebraic data in rational conformal field theories geometric structures familiar from Fourier-Mukai transformations.Comment: 19 page

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Gor Sarkissian

D-branes on a gauged WZW model

On least action D-branes

D-branes in the background of NS fivebranes

Symmetry breaking, permutation D-branes on group manifolds: boundary states and geometric description

Some remarks on defects and T-duality

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