Decomposition of the Riemann tensor
In four dimensions the Bel decomposition of the Riemann tensor, with respect to a timelike unit vector field , not necessarily geodesic or hypersurface orthogonal, consists of three pieces: # the ''electrogravitic tensor'' #* Also known as the tidal tensor. It can be physically interpreted as giving the tidal stresses on small bits of a material object (which may also be acted upon by other physical forces), or the tidal accelerations of a small cloud of test particles in a vacuum solution or electrovacuum solution. # the ''magnetogravitic tensor'' #* Can be interpreted physically as a specifying possible spin-spin forces on spinning bits of matter, such as spinning test particles. # the ''topogravitic tensor'' #* Can be interpreted as representing the sectional curvatures for the spatial part of a frame field. Because these are all ''transverse'' (i.e. projected to the spatial hyperplane elements orthogonal to our timelike unit vector field), they can be represented as linear operators on three-dimensional vectors, or as three-by-three real matrices. They are respectively symmetric, traceless, and symmetric (6,8,6 linearly independent components, for a total of 20). If we write these operators as E, B, L respectively, the principal invariants of the Riemann tensor are obtained as follows: * is the trace of E2 + L2 - 2 B BT, * is the trace of B ( E - L ), * is the trace of E L - B2.See also
* Bel–Robinson tensor * Ricci decomposition * Tidal tensor * Papapetrou–Dixon equations * Curvature invariantReferences