Higher-Curvature Gravity and Entanglement Entropy

Abstract: In this thesis, we focus on higher-curvature extensions of Einstein gravity as toy models to probe universal properties of conformal field theory (CFT) using the gauge/gravity duality. In this context, we are particularly interested in generalized quasi-topological gravities, i.e., theories whose equations of motion for statically spherically symmetric solutions are of second order at most. Here, we characterize the number of these theories existing at a given curvature order and dimensions. Moreover, we show that any effective higher-curvature theory is connected, via field redefinitions to some generalized quasi-topological gravity. The situation is special for three spacetime dimensions, as theories of this type have trivial equations of motion. However, when matter fields are added into the picture, the equations of motion become non-trivial, describing, among other solutions, multiparametric generalizations of the Ba~nados-Teitelboim-Zanelli black hole. From the CFT side, entanglement entropy arises as a prominent quantity that encodes important information about the field theory, such as the type A and type B trace anomalies in even dimensions and the sphere free energy of the theory in odd dimensions when considering spherical entangling regions. As entanglement entropy also includes divergences, we employ the Kounterterms scheme to extract the physically relevant quantities. In the case of three-dimensional CFTs dual to Einstein gravity, we show that the finite part is isolated and can be written in terms of the Willmore energy, providing an upper bound based on its properties. We extend this remarkable result to arbitrary CFTs under consideration. Besides, we show the validity of the Kounterterms scheme for general quadratic curvature gravity, extracting the type A, type B anomalies of the theory in even dimensions and the sphere free energy in odd ones.