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MATHEMATICS
Left-invariant almost para-Hermitian structures on some six-dimensional nilpotent Lie groups
N. K. Smolentsev Fundamental Mathematics department of Kemerovo State University, Kemerovo, Russian Federation
Abstract:
As is well known, there are
$34$ classes of isomorphic simply connected six-dimensional nilpotent Lie groups. Of these, only
$26$ classes admit left-invariant symplectic structures and only
$18$ classes admit left-invariant complex structures. There exist five six-dimensional nilpotent Lie groups
$G$, which do not admit neither symplectic, nor complex structures and, therefore, can be neither almost pseudo-Kählerian, nor Hermitian. It is the Lie groups that are studied in this work. The aim of the paper is to define new left-invariant geometric structures on the Lie groups. If the left-invariant
$2$-form
$\omega$ on such a Lie group is closed, then it is degenerate. Weakening the closedness requirement for left-invariant
$2$-forms
$\omega$, stable
$2$-forms
$\omega$ are obtained. Their exterior differential
$d\omega$ is also stable in Hitchin sense. Therefore, the pair
$(\omega, d\omega)$ defines either an almost Hermitian or almost para-Hermitian structure on the group
$G$. The corresponding pseudo-Riemannian metrics are Einstein for four of the five Lie groups under consideration. This gives new examples of multiparameter families of left-invariant Einstein pseudo-Riemannian metrics on six-dimensional nilmanifolds. On each of the Lie groups under consideration, compatible and normalized pairs of left-invariant forms
$(\omega,\rho)$, where
$\rho=d\omega$, are obtained. They define semi-flat structures. The Hitchin flow on
$G\times I$ is studied to construct a pseudo-Riemannian metric on
$G\times I$ with a holonomy group from
$G_2^*$ and it is shown that there is nots solution in this class of left-invariant half-plane structures
$(\omega,\rho)$. For structures
$(\omega,\rho)$, only the
$3$-form closure property
$\varphi=\omega \wedge dt+d\omega$ on
$G\times I$ holds.
Keywords:
nilmanifolds, six-dimensional nilpotent Lie algebras, left-invariant para-complex structures, Einstein manifolds, half-flat structures.
UDC:
514.76
MSC: 53C15,
53C30,
53C25,
22E25 Received: 01.11.2018
DOI:
10.17223/19988621/58/4
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