English

Locally conformal SKT structures

Differential Geometry 2022-11-09 v2

Abstract

A Hermitian metric on a complex manifold is called SKT (strong K\"ahler with torsion) if the Bismut torsion 33-form HH is closed. As the conformal generalization of the SKT condition, we introduce a new type of Hermitian structure, called \emph{locally conformal SKT} (or shortly LCSKT). More precisely, a Hermitian structure (J,g)(J,g) is said to be LCSKT if there exists a closed non-zero 11-form α\alpha such that dH=αHd H = \alpha \wedge H. In the paper we consider non-trivial LCSKT structures, i.e. we assume that dH0d H \neq 0 and we study their existence on Lie groups and their compact quotients by lattices. In particular, we classify 6-dimensional nilpotent Lie algebras admitting a LCSKT structure and we show that, in contrast to the SKT case, there exists a 66-dimensional 33-step nilpotent Lie algebra admitting a non-trivial LCSKT structure. Moreover, we show a characterization of even dimensional almost abelian Lie algebras admitting a non-trivial LCSKT structure, which allows us to construct explicit examples of 66-dimensional unimodular almost abelian Lie algebras admitting a non-trivial LCSKT structure. The compatibility between the LCSKT and the balanced condition is also discussed, showing that a Hermitian structure on a 6-dimensional nilpotent or a 2n2n-dimensional almost abelian Lie algebra cannot be simultaneously LCSKT and balanced, unless it is K\"{a}hler.

Keywords

Cite

@article{arxiv.2110.03280,
  title  = {Locally conformal SKT structures},
  author = {Bachir Djebbar and Ana Cristina Ferreira and Anna Fino and Nourhane Zineb Larbi Youcef},
  journal= {arXiv preprint arXiv:2110.03280},
  year   = {2022}
}

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references updated

R2 v1 2026-06-24T06:41:48.937Z