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Coarse-Graining the Lin-Maldacena Geometries

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arxiv 0705.4308 v2 pith:EIXETKUB submitted 2007-05-30 hep-th

Coarse-Graining the Lin-Maldacena Geometries

classification hep-th
keywords geometriesentropycoarse-grainedstatestatesfieldfunctiongeometry
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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The Lin-Maldacena geometries are nonsingular gravity duals to degenerate vacuum states of a family of field theories with SU(2|4) supersymmetry. In this note, we show that at large N, where the number of vacuum states is large, there is a natural `macroscopic' description of typical states, giving rise to a set of coarse-grained geometries. For a given coarse-grained state, we can associate an entropy related to the number of underlying microstates. We find a simple formula for this entropy in terms of the data that specify the geometry. We see that this entropy function is zero for the original microstate geometries and maximized for a certain ``typical state'' geometry, which we argue is the gravity dual to the zero-temperature limit of the thermal state of the corresponding field theory. Finally, we note that the coarse-grained geometries are singular if and only if the entropy function is non-zero.

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