On uniqueness of submaximally symmetric parabolic geometries
Abstract
Among (regular, normal) parabolic geometries of type (G,P), there is a locally unique maximally symmetric structure and it has symmetry dimension (G). The symmetry gap problem concerns the determination of the next realizable (submaximal) symmetry dimension. When G is a complex or split-real simple Lie group of rank at least three or when (G,P) = (G2,P2), we establish a local uniqueness result for submaximally symmetric structures of type (G,P).
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