三步幂零李群变形的几个问题

Pub Date : 2019-07-01 DOI:10.32917/HMJ/1564106545
A. Baklouti, M. Boussoffara, I. Kedim
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引用次数: 2

摘要

设G是指数可解李群,H是G的连通李子群。给定齐次空间M=G/H的任何不连续群K和K的任何变形,离散子群的变形可能破坏M上作用的适当不连续性,因为H不是紧致的(平凡的情况除外)。为了在G是三步幂零的情况下解释这一现象,我们提供了Kobayashi变形空间T(K;G;H)到Hausdorff空间的分层,这取决于相应参数空间的G-伴随轨道的维数。这允许我们建立T(k;G;H)的Hausdorffness定理。
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Some Problems of deformations on three-step nilpotent Lie groups
Let G be an exponential solvable Lie group and H a connected Lie subgroup of G. Given any discontinuous group K for the homogeneous space M=G/H and any deformation of K, deformation of discrete subgroups may destroy proper discontinuity of the action on M as H is not compact (except the case when it is trivial). To interpret this phenomenon in the case when G is a 3-step nilpotent, we provide a layering of Kobayashi's deformation space T (K; G; H) into Hausdorff spaces, which depends upon the dimensions of G-adjoint orbits of the corresponding parameter space. This allows us to establish a Hausdorffness theorem for T (k; G; H).
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