A remark on left invariant metrics on compact Lie groups
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🧮 math.DG
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compactinvariantleftmetricalwaysbiinvariantcurvaturedirection
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We show that a left invariant metric on a compact Lie group $G$ which is obtained by stretching a biinvariant metric in the direction of a subalgebra $\h$ of $\g$ always has some negative sectional curvature, unless the semi-simple part of $\h$ is an ideal of $\g$.
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