Lower-dimensional limits of cubic Lovelock gravity
Gökhan Alkaç, Gökçen Deniz Özen, Gün Süer
Abstract
We obtain the lower-dimensional limits (p=2,3,4,5,6) of cubic Lovelock gravity through a regularized Kaluza-Klein reduction. By taking a flat internal space for simplicity, we also study the static black hole solutions in the resulting theories. We show that the solutions match with the ones obtained from the “naive limit” of D-dimensional equation for the metric function, which is obtained by first scaling the relevant couplings by a factor of 1D−p and then taking the limit D→p, with one important exception: In 4D, one obtains the expected solution only for the black hole with a planar horizon.
Topics & Concepts
Limit (mathematics)Scaling limitMetric (unit)PhysicsPlanarScalingHorizonBlack hole (networking)Space (punctuation)GravitationFunction (biology)Mathematical physicsMathematical analysisMathematicsClassical mechanicsGeometryEconomicsOperations managementRouting (electronic design automation)Computer graphics (images)BiologyPhilosophyAstronomyComputer scienceEvolutionary biologyComputer networkRouting protocolLink-state routing protocolLinguisticsBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesNoncommutative and Quantum Gravity Theories