A family of left-invariant SKT metrics on the exceptional Lie group G2

Abstract

For a complex manifold (M,J), an SKT (or pluriclosed) metric is a J-Hermitian metric g whose fundamental form ω:=g(J·,·) satisfies the condition ∂∂ω=0. As such, an SKT metric can be regarded as a natural generalization of a K\"ahler metric. In this paper, the exceptional Lie group G2 is equipped with a left-invariant integrable almost complex structure J via the Samelson construction and a 7-parameter family of J-Hermitian metrics is constructed. From this 7-parameter family, the members which are SKT are calculated. The result is a 3-parameter family of left-invariant SKT metrics on G2. As a special case, the aforementioned family of SKT metrics contains all bi-invariant metrics on G2. In addition, this 3-parameter family of left-invariant SKT metrics are also invariant under the right action of a certain maximal torus T of G2. Conversely, it is shown that if g is a left-invariant J-Hermitian metric on G2 such that g is invariant under the right action of T and for which (g,J) is SKT, then g must belong to this 3-parameter family of left-invariant SKT metrics.

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