Left-invariant Hermitian connections on Lie groups with almost Hermitian structures

Abstract

Left-invariant Hermitian and Gauduchon connections are studied on an arbitrary Lie group G equipped with an arbitrary left-invariant almost Hermitian structure (·,·,J). The space of left-invariant Hermitian connections is shown to be in one-to-one correspondence with the space (1,1)g g of left-invariant 2-forms of type (1,1) (with respect to J) with values in g:=Lie(G). Explicit formulas are obtained for the torsion components of every Hermitian and Gauduchon connection with respect to a convenient choice of left-invariant frame on G. The curvature of Gauduchon connections is studied for the special case G=H× A, where H is an arbitrary n-dimensional Lie group, A is an arbitrary n-dimensional abelian Lie group, and the almost complex structure is totally real with respect to h:=Lie(H). When H is compact, it is shown that H× A admits a left-invariant (strictly) almost Hermitian structure (·,·,J) such that the Gauduchon connection corresponding to the Strominger (or Bismut) connection in the integrable case is precisely the trivial left-invariant connection and, in addition, has totally skew-symmetric torsion. The almost Hermitian structure (·,·,J) on H× A is shown to satisfy the strong K\"ahler with torsion condition. Furthermore, the affine line of Gauduchon connections on H× A with the aforementioned almost Hermitian structure is also shown to contain a (nontrivial) flat connection.