The Einstein-Weyl spaces associated to Segre quartic surfaces

TL;DR

This paper constructs explicit examples of Einstein-Weyl structures on minitwistor spaces derived from Segre quartic surfaces, revealing their geometric properties and deformations towards standard de Sitter space.

Contribution

It provides explicit constructions of Einstein-Weyl structures associated with Segre quartic surfaces and analyzes their deformation to the standard de Sitter structure.

Findings

The Einstein-Weyl spaces have a connected component diffeomorphic to de Sitter space.

The induced Einstein-Weyl structure is Lorenzian and real-analytic.

The automorphism group of these structures is a circle, differing from standard de Sitter.

Abstract

We find explicit examples of compact minitwistor spaces of genus one, whose Einstein-Weyl spaces have a connected component that is diffeomorphic to the de Sitter space. The induced Einstein-Weyl structure on it is Lorenzian, real-analytic, whose spacelike geodesics are all closed and simple. The identity component of the automorphism group of the Einstein-Weyl structure is the circle and therefore the structure is not isomorphic to the standard de Sitter structure. We show that these Einstein-Weyl structures deform as the Segre surfaces deform and converge to the standard de Sitter structure. The minitwistor spaces we study are the so-called Segre quartic surfaces. They have a real pair of nodes, which play a crucial role in proving the above results. These singularities also allow us to construct explicit examples of non-compact complex surfaces that do not admit any compactification.