We determine the structure of transitive actions of compact Lie groups on spaces which have the dimension and the (rational) homotopy groups of a product S-1 x S-m of spheres.These homogeneous spaces arise in several geometric contexts and may be considered as S-1-bundles over certain spaces, e.g. over lens spaces and over certain quotients of Stiefel manifolds.Furthermore, we show that if a non-compact simply connected Lie group acts transitively on such a space, then the orbits of the maximal compact subgroups are all simply connected rational cohomology spheres of codimension one and hence classified. We obtain this by giving a short proof of the existence and structure of the natural bundle of Gorbatsevich under these much less general assumptions. In this special case the proof gets considerably shorter by the use of the homotopy properties of the spaces in question and a theorem of Mostert on the structure of orbit spaces of compact Lie groups on manifolds.
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机译:我们确定空间上紧Lie群的传递动作的结构,这些空间具有尺寸和S-1 x Sm球的乘积的(同理)同构群,这些同构空间出现在几个几何上下文中,可以视为S- 1-bundles在某些空间,例如此外,我们表明,如果一个非紧致的简单连接的李群在该空间上传递性地起作用,那么最大紧致子群的轨道都将是一维简单的有理同调球体。因此分类。我们通过简短地证明Gorbatsevich天然束的存在和结构在这些不太普遍的假设下获得了这一结果。在这种特殊情况下,通过使用所讨论空间的同伦性质和关于流形上紧凑李群的轨道空间结构的莫斯特定理,证明大大缩短。
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