Discontinuity in RG Flows Across Dimensions: Entanglement, Anomaly Coefficients and Geometry (2312.12382v2)

Abstract: We study the entanglement entropy associated with a holographic RG flow from $\textrm{AdS}7$ to $\textrm{AdS}{4} \times \mathbb{H}_3$, where $\mathbb{H}_3$ is a $3$-dimensional hyperbolic manifold with curvature $\kappa$. The dual six-dimensional RG flow is disconnected from Lorentz-invariant flows. In this context we address various notions of central charges and identify a monotonic candidate $c$-function that captures IR aspects of the flow. The UV behavior of the holographic entanglement entropy and, in particular its universal term, display an interesting dependence on the curvature, $\kappa$. We then contrast our holographic results with existing field theory computations in six dimensions and find a series of new corrections in curvature to the universal term in the entanglement entropy.