1-Lefschetz contact solvmanifolds
Abstract
We study the contact Lefschetz condition on compact contact solvmanifolds, as introduced by B.\ Cappelletti-Montano, A.\ De Nicola and I.\ Yudin. We seek to fill the gap in the literature concerning Benson-Gordon type results, characterizing 1-Lefschetz contact solvmanifolds. We prove that the 1-Lefschetz condition on Lie algebras is preserved via 1-dimensional central extensions by a symplectic cocycle, thereby establishing that a unimodular symplectic Lie algebra (h, ω) is 1-Lefschetz if and only if its contactization (g, η) is 1-Lefschetz. We achieve this by showing an explicit relation for the relevant cohomology degrees of h and g. Using this, we show how the commutators [h,h] and [g,g] are related, especially when the 1-Lefschetz condition holds. By specializing to the nilpotent setting, we prove that 1-Lefschetz contact nilmanifolds equipped with an invariant contact form are quotients of a Heisenberg group, and deduce that there are many examples of compact K-contact solvmanifolds not admitting compatible Sasakian structures. We also construct examples of completely solvable 1-Lefschetz solvmanifolds, some having the 2-Lefschetz property and some failing it.
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