Solvable models for Kodaira surfaces

Abstract

We consider three families of lattices on the oscillator group G, which is an almost nilpotent not completely solvable Lie group, giving rise to coverings G Mk, 0 Mk, π Mk, π/2 for k∈ . We show that the corresponding families of four dimensional solvmanifolds are not pairwise diffeomorphic and we compute their cohomology and minimal models. In particular, each manifold Mk, 0 is diffeomorphic to a Kodaira--Thurston manifold, i.e. a compact quotient S1 × 3 () /k where k is a lattice of the real three-dimensional Heisenberg group 3 (). We summarize some geometric aspects of those compact spaces. In particular, we note that any Mk, 0 provides an example of a solvmanifold whose cohomology does not depend on the Lie algebra only and which admits many symplectic structures that are invariant by the group ×3 () but not under the oscillator group G.