Entanglement Entropy of a Non-Minimally Coupled Self-Interacting Scalar across a Schwarzschild Horizon at O(α)
Abstract
We compute the first-order correction in the quartic coupling α to the entanglement entropy of a massive, non-minimally coupled scalar across the horizon of a four-dimensional Schwarzschild black hole, treating the non-minimal coupling as a free parameter. Combining the replica trick on the conical manifold Mn with heat-kernel methods in proper-time regularization, we obtain a closed-form expression for δ S(1)(m,α,). The bare correction exhibits a log-enhanced quadratic divergence ε-2(m2ε2), arising from interference between bulk fluctuations and the distributional curvature at the tip; we show it is cancelled at O(α) by the bulk mass counterterm. The residual m2(m2ε2) divergence renormalizes Newton's constant, preserving SBH = A / 4 GF. The correction is proportional to (1/6-) and vanishes identically for conformal coupling.
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