Litcius/Paper detail

Exact Spherically Symmetric Solutions in Modified Gauss–Bonnet Gravity from Noether Symmetry Approach

Sebastian Bahamonde, Konstantinos Dialektopoulos, Ugur Camci

2020Symmetry23 citationsDOIOpen Access PDF

Abstract

It is broadly known that Lie point symmetries and their subcase, Noether symmetries, can be used as a geometric criterion to select alternative theories of gravity. Here, we use Noether symmetries as a selection criterion to distinguish those models of f ( R , G ) theory, with R and G being the Ricci and the Gauss–Bonnet scalars respectively, that are invariant under point transformations in a spherically symmetric background. In total, we find ten different forms of f that present symmetries and calculate their invariant quantities, i.e., Noether vector fields. Furthermore, we use these Noether symmetries to find exact spherically symmetric solutions in some of the models of f ( R , G ) theory.

Topics & Concepts

Noether's theoremHomogeneous spacePhysicsInvariant (physics)Mathematical physicsSymmetry (geometry)Point (geometry)Killing vector fieldGauge symmetryf(R) gravityLocal symmetryGravitationMathematicsCircular symmetryDifferential geometryVector fieldType (biology)Advanced Differential Geometry ResearchBlack Holes and Theoretical PhysicsCosmology and Gravitation Theories