Self-Dual Conformal Gravity

TL;DR

This paper establishes conditions under which four-dimensional anti-self-dual conformal manifolds are locally conformal to Ricci-flat spaces, generalizing the Bach tensor and analyzing special cases in Riemannian and neutral signatures.

Contribution

It introduces scalar and tensor conformal invariants that characterize conformal Ricci-flatness in anti-self-dual manifolds and explores their implications in various signatures.

Findings

Obstructions to conformal Ricci-flatness are expressed via new invariants.

LeBrun's anti-self-dual metrics are not conformally Ricci-flat on any open set.

Classified anti-self-dual metrics with parallel spinors in neutral signature.

Abstract

We find necessary and sufficient conditions for a Riemannian four-dimensional manifold $(M, g)$ with anti-self-dual Weyl tensor to be locally conformal to a Ricci--flat manifold. These conditions are expressed as the vanishing of scalar and tensor conformal invariants. The invariants obstruct the existence of parallel sections of a certain connection on a complex rank-four vector bundle over $M$. They provide a natural generalisation of the Bach tensor which vanishes identically for anti-self-dual conformal structures. We use the obstructions to demonstrate that LeBrun's anti-self-dual metrics on connected sums of $\CP^2$s are not conformally Ricci-flat on any open set. We analyze both Riemannian and neutral signature metrics. In the latter case we find all anti-self-dual metrics with a parallel real spinor which are locally conformal to Einstein metrics with non-zero cosmological constant. These metrics admit a hyper-surface orthogonal null Killing vector and thus give rise to projective structures on the space of $\beta$-surfaces.