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W2050767443 abstract "Using the recently constructed basis for local operators in free SO(N) gauge theory we derive an exact formula for the correlation functions of multi trace operators. This formula is used to obtain a simpler form and a simple product rule for the operators in the SO(N) basis. The coefficients of the product rule are the Littlewood-Richardson numbers which determine the corresponding product rule in free U(N) gauge theory. SO(N) gauge theory is dual to a non-oriented string theory on the AdS5 × $ mathcal{R}{{mathrm{P}}^5} $ geometry. To explore the physics of this string theory we consider the limit of the gauge theory that, for the U(N) gauge theory, is dual to the pp-wave limit of AdS5 × S 5. Non-planar unoriented ribbon diagrams do not survive this limit. We give arguments that the number of operators in our basis matches counting using the exact free field partition function of free SO(N) gauge theory. We connect the basis we have constructed to free fermions, which has a natural interpretation in terms of a class of $ frac{1}{2} $ -BPS bubbling geometries, which arise as orientifolds of type IIB string theory. Finally, we obtain a complete generalization of these results to Sp(N) gauge theory by proving that the finite N physics of SO(N) and Sp(N) gauge theory are related by exchanging symmetrizations and antisymmetrizations and replacing N by − N." @default.
W2050767443 created "2016-06-24" @default.
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W2050767443 date "2013-06-01" @default.
W2050767443 modified "2023-10-17" @default.
W2050767443 title "Operators, correlators and free fermions for SO(N) and Sp(N)" @default.
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W2050767443 doi "https://doi.org/10.1007/jhep06(2013)018" @default.
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