Lessons from f(R,Rc2,Rm2, Lm) gravity: Smooth Gauss-Bonnet limit, energy-momentum conservation and nonminimal coupling

Abstract

This paper studies a generic fourth-order theory of gravity with Lagrangian density f(R,Rc2,Rm2, Lm). By considering explicit R2 dependence and imposing the "coherence condition" fR2\!=\!fRm2\!=\! -fRc2/4, the field equations of f(R,R2,Rc2,Rm2, Lm) gravity can be smoothly reduced to that of f(R,G,Lm) generalized Gauss-Bonnet gravity. We use Noether's conservation law to study the f(R1,R2…,Rn,Lm) model with nonminimal coupling between Lm and Riemannian invariants Ri, and conjecture that the gradient of nonminimal gravitational coupling strength ∇μ f\!Lm is the only source for energy-momentum non-conservation. This conjecture is applied to the f(R,Rc2,Rm2, Lm) model, and the equations of continuity and non-geodesic motion of different matter contents are investigated. Finally, the field equation for Lagrangians including the traceless-Ricci square and traceless-Riemann (Weyl) square invariants is derived, the f(R,Rc2,Rm2, Lm) model is compared with the f(R,Rc2,Rm2,T)+2 Lm model, and consequences of nonminimal coupling for black hole and wormhole physics are considered.