Geometric structures of vectorial type
Abstract
We study geometric structures of W4-type in the sense of A. Gray on a Riemannian manifold. If the structure group G ⊂ (n) preserves a spinor or a non-degenerate differential form, its intrinsic torsion is a closed 1-form (Proposition dGamma and Theorem Fixspinor). Using a G-invariant spinor we prove a splitting theorem (Proposition splitting). The latter result generalizes and unifies a recent result obtained in Ivanov&Co, where this splitting has been proved in dimensions n=7,8 only. Finally we investigate geometric structures of vectorial type and admitting a characteristic connection ∇c. An interesting class of geometric structures generalizing Hopf structures are those with a ∇c-parallel intrinsic torsion . In this case, induces a Killing vector field (Proposition Killing) and for some special structure groups it is even parallel.
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