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... Matrix theory of gravitation W. Köhler 5 To describe curvature in Riemannian geometry, we define the ”rho”-tensor-matrix, as the antisymmetric partial derivative of the basis ρµν def = τµ,ν − τν,µ. =-=(16)-=- The tensor property (covariant transformation rule) of this matrix-tensor is evident. It consists of 6 hermitian matrices and thus contains 4×6 = 24 real components. From ρµν ≡ 0 follows the vanishin...