Tangent Lie groups are Riemannian naturally reductive spaces
Abstract
Given a compact Lie group G with Lie algebra g, we consider its tangent Lie group TG GAd g. In this short note, we prove that TG admits a left-invariant naturally reductive Riemannian metric g and a metric connection with skew torsion ∇ such that (TG,g,∇) is naturally reductive. An alternative spinorial description of the same connection on the direct product G× g generalizes in a rather subtle way to TS7, which is in many senses almost a tangent Lie group.
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