Failure of Lichnerowicz-type result in parabolic geometries of real rank at least 3
Abstract
Given a Yamaguchi nonrigid parabolic model geometry (G,P) with G simple of real rank at least 3, we use techniques developed by Erickson to establish the existence of closed, nonflat, essential, regular, normal Cartan geometries modeled on (G,P). Yamaguchi nonrigidity is a necessary condition for admitting nonflat, regular, normal examples. This rules out Lichnerowicz-type conjectures for these model geometries.
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