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| In ], a '''flux compactification''' is a particular way to deal with additional dimensions required by ] in which the shape of the internal ] is a ] or its generalization which is moreover equipped with non-zero values of fluxes, i.e. ]s that generalize the concept of a ] (see ]). The hypothetical concept of the ] in string theory follows from a large number of possibilities in which the integers that characterize the fluxes can be chosen without violating rules of string theory. The flux compactifications can be described as ] vacua or ] vacua with or without ]s. | In ], a '''flux compactification''' is a particular way to deal with additional dimensions required by ] in which the shape of the internal ] is a ] or its generalization which is moreover equipped with non-zero values of fluxes, i.e. ]s that generalize the concept of a ] (see ]). The hypothetical concept of the ] in string theory follows from a large number of possibilities in which the integers that characterize the fluxes can be chosen without violating rules of string theory. The flux compactifications can be described as ] vacua or ] vacua with or without ]s. | ||
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Revision as of 21:51, 30 August 2006
Template:Linkless-date In theoretical physics, a flux compactification is a particular way to deal with additional dimensions required by string theory in which the shape of the internal manifold is a Calabi-Yau manifold or its generalization which is moreover equipped with non-zero values of fluxes, i.e. differential forms that generalize the concept of a magnetic field (see p-form electrodynamics). The hypothetical concept of the anthropic landscape in string theory follows from a large number of possibilities in which the integers that characterize the fluxes can be chosen without violating rules of string theory. The flux compactifications can be described as F-theory vacua or type IIB string theory vacua with or without D-branes.
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