Symplectic solvmanifolds not satisfying the hard-Lefschetz condition

Abstract

For Lie groups G of the form G = k φ m, with k + m even, a result of H. Kasuya shows that if the action φ:k Aut(m) is semisimple then any symplectic solvmanifold ( G, ω) satisfies the hard-Lefschetz condition for any symplectic form. In this article, we prove the converse in the case k = 1 and G completely solvable: no symplectic form on such a solvmanifold satisfies the hard-Lefschetz condition if φ is not semisimple; moreover, we show that the failure occurs either at degree 1 or at degree 2 in cohomology, depending on the spectrum of the differential of the action φ. This result is achieved through a detailed analysis of the cohomology groups H1(), H2(), H2n-2(), H2n-1() of the Lie algebra of such Lie groups. Among other things, this analysis yields useful representatives for each cohomology class corresponding to any symplectic form on , allowing the most delicate cases to be reduced to a straightforward computation. We also construct lattices for many of the Lie groups under consideration, thereby exhibiting examples of symplectic solvmanifolds of completely solvable Lie groups failing to have the hard-Lefschetz property for any symplectic form.