Gaussian measure on the dual of U(N), random partitions, and topological expansion of the partition function
Abstract
We study a Gaussian measure with parameter q∈(0,1) on the dual of the unitary group of size N: we prove that a random highest weight under this measure is the coupling of two independent q-uniform random partitions α,β and a random highest weight of U(1). We prove deviation inequalities for the q-uniform measure, and use them to show that the coupling of random partitions under the Gaussian measure vanishes in the limit N∞. We also prove that the partition function of this measure admits an asymptotic expansion in powers of 1/N, and that this expansion is topological, in the sense that its coefficients are related to the enumeration of ramified coverings of elliptic curves. It provides a rigorous proof of the gauge/string duality for the Yang-Mills theory on a 2D torus with gauge group U(N), advocated by Gross and Taylor GT,GT2.
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