On the Solvability of the Transvection group of Extrinsic Symplectic Symmetric Spaces
Abstract
Let M be a symplectic symmetric space, and let : M V be an extrinsic symplectic symmetric immersion, i.e., (V, ) is a symplectic vector space and is an injective symplectic immersion such that for each point p ∈ M, the geodesic symmetry in p is compatible with the reflection in the affine normal space at (p). We show that the existence of such an immersion implies that the transvection group of M is solvable.
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