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arxiv 2407.18747 v2 pith:VAVL456D submitted 2024-07-26 math.GR math.DGmath.GTmath.MG

Rigidity of proper almost-homogeneous domains in positive flag manifolds

classification math.GR math.DGmath.GTmath.MG
keywords manifoldspositiveproperboundaryflagrigidityshilovadmitting
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We show that, inside the Shilov boundary of any given Hermitian symmetric space of tube type, there is, up to isomorphism, only one proper domain such that every point on its boundary belongs to the closure of an orbit under its automorphism group. This gives a classification of all closed proper manifolds locally modelled on such Shilov boundaries, and provides a positive answer, in the case of flag manifolds admitting a $\Theta$-positive structure, to a rigidity question of Limbeek and Zimmer.

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  1. Metric properties of domains in real-type Nagano spaces

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    Defines Kobayashi-type pseudometric on domains in real-type Nagano spaces; proves it is a metric iff domain avoids photon minus point, and is never Gromov hyperbolic in higher rank for strongly R-proper dually convex ...