Torsion-free H-structures on almost Abelian solvmanifolds
Abstract
In this article, we provide a general set-up for arbitrary linear Lie groups H≤ GL(n,R) which allows to characterise the almost Abelian Lie algebras admitting a torsion-free H-structure. In more concrete terms, using that an n-dimensional almost Abelian Lie algebra g=gf is fully determined by an endomorphism f of Rn-1, we give a description of the subspace Fh of all f∈End(Rn-1) for which gf admits a ``special'' torsion-free H-structure in terms of the image of a certain linear map. For large classes of linear Lie groups H, we are able to explicitly compute Fh and so give characterisations of the almost Abelian Lie algebras admitting a torsion-free H-structure. Our results reprove all the known characterisations of the almost Abelian Lie algebras admitting a torsion-free H-structure for different single linear Lie groups H and extends them to big classes of linear Lie groups H. For example, we are able to provide characterisations in the case n=2m, H≤ GL(m,C) and H either being a complex Lie group or being totally real, or in the case that H preserves a pseudo-Riemannian metric. In many cases, we show that the space Fh coincides with what we call the characteristic subalgebra kh associated to h, and that then the torsion-free condition is equivalent to the left-invariant flatness condition. In particular, we prove this to be the case if H is a complex linear Lie group or if h does not contain any elements of rank one or two and is either metric or totally real.
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