Artículos de revistas
From almost (para)-complex structures to affine structures on Lie groups
Calvaruso, Giovanni; Ovando, Gabriela Paola; From almost (para)-complex structures to affine structures on Lie groups; Springer; Manuscripta Mathematica; 155; 1-2; 1-2018; 89-113
Ovando, Gabriela Paola
Let G= H⋉ K denote a semidirect product Lie group with Lie algebra g= h⊕ k, where k is an ideal and h is a subalgebra of the same dimension as k. There exist some natural split isomorphisms S with S2= ± Id on g: given any linear isomorphism j: h→ k, we get the almost complex structure J(x, v) = (- j- 1v, jx) and the almost paracomplex structure E(x, v) = (j- 1v, jx). In this work we show that the integrability of the structures J and E above is equivalent to the existence of a left-invariant torsion-free connection ∇ on G such that ∇ J= 0 = ∇ E and also to the existence of an affine structure on H. Applications include complex, paracomplex and symplectic geometries.
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