Entanglement entropy of a color flux tube in (1+1)D Yang-Mills theory
Abstract
In recent work arxiv:2410.00112 , we computed a novel flux tube entanglement entropy (FTE2) of the color flux tube stretched between a heavy quark-antiquark pair on a Euclidean lattice in (2+1)D Yang-Mills theory. Our numerical results suggested that FTE2 can be partitioned into an internal color entanglement entropy and a vibrational entropy corresponding to the transverse excitations of a QCD string, with the latter described by a thin string model. Since the color flux tube does not have transverse excitations in (1+1)D, we analytically compute the contribution of the internal color degrees of freedom to FTE2 in this simpler framework. For the multipartite partitioning of the color flux tube, we find the remarkable result that FTE2 only depends on the number of times the flux tube crosses the border between two spatial regions, and the dimension of the representation of the color group, but not on the string length. The result holds independently of whether the branching points are placed on the vertices of the lattice or in the center of plaquettes.
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