Explicit construction of new Moishezon twistor spaces (Q841579)

The author constructs Moishezon twistor spaces Z on \(n\mathbb{CP}^2\) for every \(n\geq 2\). These twistor spaces admit a holomorphic \(\mathbb C^*\)-action. It is shown that the twistor spaces \(Z\) are bimeromorphic to conic bundles over certain rational surfaces. The rational surfaces are the orbit spaces of \(\mathbb C^*\)-actions on \(Z\). The author explicitly construct a \(\mathbb C\mathbb P^2\)-bundle over a resolution of these surfaces, in which the conic bundle is embedded, and give explicit defining equations of the conic bundles. For the twistor spaces \(Z\) the half-anticanonical system \(|-(1\slash 2)K_Z|\) is non-empty and contains as a member a smooth, rational surface \(S\), which is a blown up of \(\mathbb {CP}^1\times \mathbb {CP}^1\). The image of the anticanonical map associated with the anticanonical system is always an intersection of two hyperquadrics in \(\mathbb {CP}^4\). The author shows also that his twistor spaces can be obtained as \(\mathbb C^*\)-equivariant deformations of the twistor spaces of some self-dual Joyce metrics on \(n\mathbb{CP}^2\) and that they can not be obtained as \(\mathbb C^*\)-equivariant deformations of the LeBrun's twistor spaces. When \(n=2\) the constructed spaces coincide with twistor spaces constructed by Y. Poon.