CYT and SKT Metrics on Compact Semi-Simple Lie Groups

Abstract

A Hermitian metric on a complex manifold (M, I) of complex dimension n is called Calabi-Yau with torsion (CYT) or Bismut-Ricci flat, if the restricted holonomy of the associated Bismut connection is contained in SU(n) and it is called strong K\"ahler with torsion (SKT) or pluriclosed if the associated fundamental form F is ∂ ∂-closed. In the paper we study the existence of left-invariant SKT and CYT metrics on compact semi-simple Lie groups endowed with a Samelson complex structure I. In particular, we show that if I is determined by some maximal torus T and g is a left-invariant Hermitian metric, which is also invariant under the right action of the torus T, and is both CYT and SKT, then g has to be Bismut flat.

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