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Let (G, H, σ) be a symmetric pair and g = m ⊕ h 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 that there is 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 which allows us to give examples of symmetric spaces with special affine connections.Finally we compute the holonomy Lie algebra of special affine connections.
Dani et al. (Mon,) studied this question.