Exact Mutual Information Difference: Scalar vs. Maxwell Fields
Abstract
We compute, for any R\'enyi index n, the exact difference between the mutual R\'enyi informations of a pair of free massless scalars and that of a Maxwell field in d=4 dimensions. Using the standard dimensional reduction method in polar coordinates, the problem is mapped to that of a single scalar field in d=2 with Dirichlet boundary conditions, which in turn can be conveniently related to the algebra of a chiral current on the full line. This latter identification, which maps algebras on an interval to two-interval algebras, yields exact results that clarify the structure of the long-distance OPE perturbative expansion of the mutual information. We find that this series has a finite radius of convergence only for integer n>1, while it becomes only asymptotical for n=1 and general non-integer values of n.
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