Young diagrams, Brauer algebras, and bubbling geometries
Abstract
We study the 1/4 BPS geometries corresponding to the 1/4 BPS operators of the dual gauge theory side, in N=4 SYM. By analyzing asymptotic structure and flux integration of the geometries, we present a mapping between droplet configurations arising from the geometries and Young diagrams of the Brauer algebra. In particular, the integer k classifying the operators in the Brauer basis is mapped to the mixing between the two angular directions.
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