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Some Results on Mutual Information of Disjoint Regions in Higher Dimensions

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arxiv 1304.7985 v3 pith:QWHJ5ZNC submitted 2013-04-30 hep-th cond-mat.stat-mech

Some Results on Mutual Information of Disjoint Regions in Higher Dimensions

classification hep-th cond-mat.stat-mech
keywords regionsfieldinformationmutualdimensionaldimensionsdisjointexplicit
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We consider the mutual Renyi information I^n(A,B)=S^n_A+S^n_B-S^n_{AUB} of disjoint compact spatial regions A and B in the ground state of a d+1-dimensional conformal field theory (CFT), in the limit when the separation r between A and B is much greater than their sizes R_{A,B}. We show that in general I^n(A,B)\sim C^n_AC^n_B(R_AR_B/r^2)^a, where a the smallest sum of the scaling dimensions of operators whose product has the quantum numbers of the vacuum, and the constants C^n_{A,B} depend only on the shape of the regions and universal data of the CFT. For a free massless scalar field, where 2x=d-1, we show that C^2_AR_A^{d-1} is proportional to the capacitance of a thin conducting slab in the shape of A in d+1-dimensional electrostatics, and give explicit formulae for this when A is the interior of a sphere S^{d-1} or an ellipsoid. For spherical regions in d=2 and 3 we obtain explicit results for C^n for all n and hence for the leading term in the mutual information by taking n->1. We also compute a universal logarithmic correction to the area law for the Renyi entropies of a single spherical region for a scalar field theory with a small mass.

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  1. Mutual Information from Modular Flow in General CFTs

    hep-th 2026-04 unverdicted novelty 8.0

    A hierarchy of approximations to the mutual information in CFTs is derived from modular flow and two-point functions of primaries, providing a high-precision formula for arbitrary ball separations that supersedes prev...