Almost K\"ahler structures on four dimensional unimodular Lie algebras

Abstract

Let J be an almost complex structure on a 4-dimensional and unimodular Lie algebra g. We show that there exists a symplectic form taming J if and only if there is a symplectic form compatible with J. We also introduce groups H+J(g) and H-J(g) as the subgroups of the Chevalley-Eilenberg cohomology classes which can be represented by J-invariant, respectively J-anti-invariant, 2-forms on g. and we prove a cohomological J-decomposition theorem following DLZ: H2(g)=H+J(g) H-J(g). We discover that tameness of J can be characterized in terms of the dimension of HJ(g), just as in the complex surface case. We also describe the tamed and compatible symplectic cones respectively. Finally, two applications to homogeneous J on 4-manifolds are obtained.