Confinement in 3D Gluodynamics as a 2D Critical Phenomenon
Abstract
Gluodynamics in 3D spacetime with one spatial direction compactified into a circle of length L is studied. The confinement order parameters, such as the Polyakov loops, are analyzed in both the limits L 0 and L ∞. In the latter limit the behavior of the confinement order parameters is shown to be described by a 2D non-linear sigma-model on the compact coset space G/ad G, where G is the gauge group and ad G its adjoint action on G. Topological vortex-like excitations of the compact field variable cause a Kosterlitz-Thouless phase transition which is argued to be associated with the confinement phase transition in the 3D gluodynamics.
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