The Jordan algebras of Riemann, Weyl and curvature compatible tensors
Abstract
Given the Riemann, or the Weyl, or a generalized curvature tensor K, a symmetric tensor bij is named `compatible' with the curvature tensor if bim Kjklm + bjm Kkilm + bkm Kijlm = 0. Amongst showing known and new properties, we prove that they form a special Jordan algebra, i.e. the symmetrized product of K-compatible tensors is K-compatible.
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