Wilson loop expectations in SU(N) lattice gauge theory
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This article gives a rigorous formulation and proof of the $1/N$ expansion for Wilson loop expectations in strongly coupled $SU(N)$ lattice gauge theory in any dimension. The coefficients of the expansion are represented as absolutely convergent sums over trajectories in a string theory on the lattice, establishing a kind of gauge-string duality. Moreover, it is shown that in large $N$ limit, calculations in $SU(N)$ lattice gauge theory with coupling strength $2\beta$ corresponds to those in $SO(N)$ lattice gauge theory with coupling strength $\beta$ when $|\beta|$ is sufficiently small.
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The heat-kernel master field on $\mathbb{Z}^d$ at strong coupling
Proves infinite-volume large-N limits, factorization, and 1/N expansion for Wilson loops in heat-kernel Yang-Mills on Z^d, plus area-law bound for the master field.
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