English

From almost (para)-complex structures to affine structures on Lie groups

Differential Geometry 2016-04-29 v1

Abstract

Let G=HKG=H\ltimes K denote a semidirect product Lie group with Lie algebra g=hk\mathfrak g=\mathfrak h \oplus \mathfrak k, where k\mathfrak k is an ideal and h\mathfrak h is a subalgebra of the same dimension as k\mathfrak k. There exist some natural split isomorphisms SS with S2=±IdS^2=\pm \,Id on g\mathfrak g: given any linear isomorphism j:hkj:\mathfrak h \to \mathfrak k, we have the almost complex structure J(x,v)=(j1v,jx)J(x,v)=(-j^{-1}v, jx) and the almost paracomplex structure E(x,v)=(j1v,jx)E(x,v)=(j^{-1}v, jx). In this work we show that the integrability of the structures JJ and EE above is equivalent to the existence of a left-invariant torsion-free connection \nabla on GG such that J=0=E\nabla J=0=\nabla E and also to the existence of an affine structure on HH. Applications include complex, paracomplex and symplectic geometries.

Keywords

Cite

@article{arxiv.1604.08433,
  title  = {From almost (para)-complex structures to affine structures on Lie groups},
  author = {Giovanni Calvaruso and Gabriela P. Ovando},
  journal= {arXiv preprint arXiv:1604.08433},
  year   = {2016}
}

Comments

23 pages

R2 v1 2026-06-22T13:43:30.192Z