Probing pure Lovelock gravity by Nariai and Bertotti-Robinson solutions

Abstract

The product spacetimes of constant curvature describe in Einstein gravity, which is linear in Riemann curvature, Nariai metric which is a solution of -vacuum when curvatures are equal, k1=k2, while it is Bertotti-Robinson metric describing uniform electric field when curvatures are equal and opposite, k1=-k2. We probe pure Lovelock gravity by these simple product spacetimes and prove that the same characterization of these solutions is indeed true in general for pure Lovelock gravitational equation of order N in d=2N+2 dimension. We also consider these solutions for the conventional setting of Einstein-Gauss-Bonnet gravity.