On the symmetry classes of the first covariant derivatives of tensor fields
Abstract
We show that the symmetry classes of torsion-free covariant derivatives ∇ T of r-times covariant tensor fields T can be characterized by Littlewood-Richardson products σ [1] where σ is a representation of the symmetric group Sr which is connected with the symmetry class of T. If σ = [λ] is irreducible then σ [1] has a multiplicity free reduction [λ][1] = Σ [μ] and all primitive idempotents belonging to that sum can be calculated from a generating idempotent e of the symmetry class of T by means of the irreducible characters or of a discrete Fourier transform of Sr+1. We apply these facts to derivatives ∇ S, ∇ A of symmetric or alternating tensor fields. The symmetry classes of the differences ∇ S - sym(∇ S) and ∇ A - alt(∇ A) are characterized by Young frames (r, 1) and (2, 1r-1), respectively. However, while the symmetry class of ∇ A - alt(∇ A) can be generated by Young symmetrizers of (2, 1r-1), no Young symmetrizer of (r, 1) generates the symmetry class of ∇ S - sym(∇ S). Furthermore we show in the case r = 2 that ∇ S - sym(∇ S) and ∇ A - alt(∇ A) can be applied in generator formulas of algebraic covariant derivative curvature tensors. For certain symbolic calculations we used the Mathematica packages Ricci and PERMS.
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