具有属性(T)作用于圆的群

Bruno Duchesne
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引用次数: 1

摘要

我们展示了一个具有性质(T)的非初等连续作用于圆上的拓扑群G。这个群是homo + (s1)的一个不可数的完全不连通的闭子群,它有一个大的酉对偶,因为它是分开点的。它来自树突的同胚性和万花筒结构。或者,它可以被看作是一组保留双曲盘某些特定测地线层合的元素。我们还证明了这种作用在共轭之前是唯一的,并且不能以任何方式平滑。最后,我们确定了群G的普遍最小流。
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A group with Property (T) acting on the circle
We exhibit a topological group G with property (T) acting non-elementarily and continuously on the circle. This group is an uncountable totally disconnected closed subgroup of Homeo + (S 1). It has a large unitary dual since it separates points. It comes from homeomorphisms of dendrites and a kaleidoscopic construction. Alternatively, it can be seen as the group of elements preserving some specific geodesic lamination of the hyperbolic disk. We also prove that this action is unique up to conjugation and that it can't be smoothened in any way. Finally, we determine the universal minimal flow of the group G.
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