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Дифференциальная геометрия и приложения
15 апреля 2024 г. 16:45, г. Москва, ГЗ МГУ, ауд. 16-10


Rigidity of locally Hermitian symmetric rank one manifolds of infinite volume

Б. Н. Апанасов

Аннотация: We address G.D.Mostow, L.Bers and S.L.Krushkal questions on uniqueness of conformal or spherical CR structures on the sphere at infinity of non-compact symmetric rank one spaces $X$ compatible with the action of a discrete isometry group $G$ (which is crucial for non-triviality of deformations of $X/G$) . We construct a class of non-rigid discrete isometry groups $G$ whose quotients $X/G$ have infinite volumes, the limit set $\Lambda(G)\subset\partial_{\infty} X$ could be the whole sphere at infinity and whose non-trivial deformations are induced by equivariant homeomorphisms of the symmetric space (possibly Hermitian) with bounded distortion. This non-rigidity is related to non-ergodic dynamics of our discrete isometry group actions on the limit set $\Lambda(G)$ which could be the whole sphere at infinity.


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