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The commutative nonassociative algebra of metric curvature tensors
2021
Forum of Mathematics, Sigma
The space of tensors of metric curvature type on a Euclidean vector space carries a two-parameter family of orthogonally invariant commutative nonassociative multiplications invariant with respect to the symmetric bilinear form determined by the metric. For a particular choice of parameters these algebras recover the polarization of the quadratic map on metric curvature tensors that arises in the work of Hamilton on the Ricci flow. Here these algebras are studied as interesting examples of
doi:10.1017/fms.2021.69
fatcat:tstflyo3wzccvno33vkbcgsfvi