New quasi-Einstein metrics on a two-sphere

Abstract

We construct all axi-symmetric non-gradient m-quasi-Einstein structures on a two-sphere. This includes the spatial cross-section of the extreme Kerr black hole horizon corresponding to m=2, as well as a family of new regular metrics with m≠ 2 given in terms of hypergeometric functions. We also show that in the case m=-1 with vanishing cosmological constant the only orientable compact solution in dimension two is the flat torus, which proves that there are no compact surfaces with a metrisable affine connection with skew Ricci tensor.