Brane-Antibrane Systems on Calabi-Yau Spaces
Abstract
We propose a correspondence between brane-antibrane systems and stable triples (E1,E2,T), where E1,E2 are holomorphic vector bundles and the tachyon T is a map between them. We demonstrate that, under the assumption of holomorphicity, the brane-antibrane field equations reduce to a set of vortex equations, which are equivalent to the mathematical notion of stability of the triple. We discuss some examples and show that the theory of stable triples suggests a new notion of BPS bound states and stability, and curious relations between brane-antibrane configurations and wrapped branes in higher dimensions.
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