A Levi-type decomposition on two-step solvable Lie algebras with a complex structure
Abstract
We prove that a large class of 2-step solvable Lie algebras equipped with a complex structure J admits a Levi-Malcev type decomposition, adapted to J. As an application, we prove that the Fino--Vezzoni conjecture holds true for 2-step solvable unimodular Lie algebras. Finally, we give a structural characterisation of 2-step, unimodular, completely solvable Lie algebras admitting an SKT metric.
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