Cellular homology of compact groups: Split real forms

Mauro Patrão, Ricardo Sandoval
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Abstract

In this article, we use the Bruhat and Schubert cells to calculate the cellular homology of the maximal compact subgroup $K$ of a connected semisimple Lie group $G$ whose Lie algebra is a split real form. We lift to the maximal compact subgroup the previously known attaching maps for the maximal flag manifold and use it to characterize algebraically the incidence order between Schubert cells. We also present algebraic formulas to compute the boundary maps which extend to the maximal compact subgroups similar formulas obtained in the case of the maximal flag manifolds. Finally, we apply our results to calculate the cellular homology of $\mbox{SO}(3)$ as the maximal compact subgroup of $\mbox{SL}(3, \mathbb{R})$ and the cellular homology of $\mbox{SO}(4)$ as the maximal compact subgroup of the split real form $G_2$.
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紧凑群的细胞同源性拆分实数形式
在这篇文章中,我们利用布鲁哈特和舒伯特单元来计算一个连通的半简单李群$G$的最大紧凑子群$K$的单元同源性,该李群的李代数是一个分裂实形式。我们将之前已知的最大旗面形的附图提升到最大紧凑子群,并用它来描述舒伯特单元之间入射阶的代数特征。我们还提出了计算边界映射的代数公式,这些公式把在最大旗流形情况下得到的类似公式推广到了最大紧凑子群。最后,我们应用我们的结果计算了作为$\mbox{SO}(3, \mathbb{R})$的最大紧凑子群的$\mbox{SO}(3)$的细胞同源性,以及作为分裂实形式$G_2$的最大紧凑子群的$\mbox{SO}(4)$的细胞同源性。
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