根子系统图库

Pub Date : 2024-04-24 DOI:10.1007/s10468-024-10269-7
Vladimir Shchigolev
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引用次数: 0

摘要

我们考虑了从有限根系统的根子系统到韦尔室的投影和提升操作。将这些操作扩展到带标记的画廊,我们就能得到满足某些共同过墙性质的画廊对。这些对产生了作者早先考虑过的博特-萨缪尔森(Bott-Samelson)变体范畴中的某些态。我们在此证明,所有这些变形都定义了博特-萨缪尔森变项(基于拉乌尔-博特和汉斯-萨缪尔森提出的紧凑李群的原始解释)的嵌入,它们相对于紧凑环是偏斜不变的。我们证明,这些来自投影和提升的嵌入保留了紧凑环固定点集合上的两个自然阶。我们还考虑了这些嵌入对等变同调的应用。投影和提升操作也可以分别应用于画廊的每一段。我们将描述一些条件,使我们能够将以这种方式得到的图廊粘合在一起。
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Galleries for Root Subsystems

We consider the operations of projection and lifting of Weyl chambers to and from a root subsystems of a finite roots system. Extending these operations to labeled galleries, we produce pairs of such galleries that satisfy some common wall crossing properties. These pairs give rise to certain morphisms in the category of Bott-Samelson varieties earlier considered by the author. We prove here that all these morphisms define embeddings of Bott-Samelson varieties (considered in the original interpretation based on compact Lie groups due to Raoul Bott and Hans Samelson) skew invariant with respect to the compact torus. We prove that those embeddings that come from projection and lifting preserve two natural orders on the set of the points fixed by the compact torus. We also consider the application of these embeddings to equivariant cohomology. The operations of projection and lifting can also be applied separately to each segment of a gallery. We describe conditions that allow us to glue together the galleries obtained this way.

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