Pseudo-K\"ahler and hypersymplectic structures on semidirect products
Abstract
We study left-invariant pseudo-K\"ahler and hypersymplectic structures on semidirect products G H; we work at the level of the Lie algebra gh. In particular we consider the structures induced on gh by existing pseudo-K\"ahler structures on g and h; we classify all semidirect products of this type with g of dimension 4 and h=R2. In the hypersymplectic setting, we consider a more general construction on semidirect products. We construct a large class of hypersymplectic Lie algebras whose underlying complex structure is not abelian as well as non-flat hypersymplectic metrics on k-step nilpotent Lie algebras for every k≥3.
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