Conics, Twistors, and anti-self-dual tri-K\"ahler metrics

Abstract

We describe the range of the Radon transform on the space M of irreducible conics in 2 in terms of natural differential operators associated to the SO(3)-structure on M=SL(3, )/SO(3) and its complexification. Following moraru we show that for any function F in this range, the zero locus of F is a four-manifold admitting an anti-self-dual conformal structure which contains three different scalar-flat K\"ahler metrics. The corresponding twistor space Z admits a holomorphic fibration over 2. In the special case where Z=31 the twistor lines project down to a four-parameter family of conics which form triangular Poncelet pairs with a fixed base conic.