The canonical Einstein metric on G₂ is dynamically unstable under the Ricci flow
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🧮 math.DG
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unstablebi-invariantcompactdynamicallyeinsteinflowgroupmetric
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In this note we show that the bi-invariant Einstein metric on the compact Lie group $G_{2}$ is dynamically unstable as a fixed point of the Ricci flow. This completes the stability analysis for the bi-invariant metrics on the compact, connected, simple Lie groups. Interestingly, $G_{2}$ is the only unstable exceptional group.
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