Scalar--flat K\"ahler metrics with conformal Bianchi V symmetry

Abstract

We provide an affirmative answer to a question posed by Tod Tod:1995b, and construct all four-dimensional Kahler metrics with vanishing scalar curvature which are invariant under the conformal action of Bianchi V group. The construction is based on the combination of twistor theory and the isomonodromic problem with two double poles. The resulting metrics are non-diagonal in the left-invariant basis and are explicitly given in terms of Bessel functions and their integrals. We also make a connection with the LeBrun ansatz, and characterise the associated solutions of the SU(∞) Toda equation by the existence a non-abelian two-dimensional group of point symmetries.