Special Affine Connections on Symmetric Spaces
Abstract
Let (G,H,σ) be a symmetric pair and g=mh the canonical decomposition of the Lie algebra g of G. We denote by ∇0 the canonical affine connection on the symmetric space G/H. A torsion-free G-invariant affine connection on G/H is called special if it has the same curvature as ∇0. A special product on m is a commutative, associative, and Ad(H)-invariant product. We show a one-to-one correspondence between the set of special affine connections on G/H and the set of special products on m. We introduce a subclass of symmetric pairs called strongly semi-simple for which we prove that the canonical affine connection on G/H is the only special affine connection, and we give many examples. We study a subclass of commutative, associative algebra, allowing us to give examples of symmetric spaces with special affine connections. Finally, we compute the holonomy Lie algebra of special affine connections.
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