Eigenvalue density of Wilson loops in 2D SU(N) YM at large N
classification
✦ hep-th
keywords
densityeigenvalueloopwilsonanalysisassociatedaveragescritical
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The eigenvalue density of a Wilson loop matrix W associated with a simple loop in two-dimensional Euclidean SU(N) Yang-Mills theory undergoes a phase transition at a critical size in the infinite-N limit. The averages of 1/det(z-W) and det(1+uW)/(1-vW) at finite N lead to two different smoothed out expressions. It is shown by a saddle-point analysis that both functions tend to the known singular result at infinite N.
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