级数为 m 的模数空间中密集轨道的极限分布 (m+1)- 空间中的离散子群

Pub Date : 2024-04-03 DOI:10.1093/imrn/rnae046
Michael Bersudsky, Hao Xing
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引用次数: 0

摘要

我们研究了作用于 $H\backslash \textrm{SL}(m+1,\mathbb{R})$ 的晶格子群 $\Gamma \leq \textrm{SL}(m+1,\mathbb{R})$ 的致密轨道的极限分布,关于增长规范球的滤波。我们工作的新颖之处在于,我们所考虑的组 $H$ 有无限多的非三维连通成分。对于这样一个特定的 $H$,同质空间 $H\backslash G$ 与 $X_{m,m+1}$--$\mathbb{R}^{m+1}$中秩为 $m$ 的离散子群的模空间--相一致。这项研究的灵感来自沙皮拉-萨金特(Shapira-Sargent)的工作,他研究了 $X_{2,3}$ 上的随机漫步。
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Limiting Distribution of Dense Orbits in a Moduli Space of Rank m Discrete Subgroups in (m+1)-Space
We study the limiting distribution of dense orbits of a lattice subgroup $\Gamma \leq \textrm{SL}(m+1,\mathbb{R})$ acting on $H\backslash \textrm{SL}(m+1,\mathbb{R})$, with respect to a filtration of growing norm balls. The novelty of our work is that the groups $H$ we consider have infinitely many non-trivial connected components. For a specific such $H$, the homogeneous space $H\backslash G$ identifies with $X_{m,m+1}$, a moduli space of rank $m$-discrete subgroups in $\mathbb{R}^{m+1}$. This study is motivated by the work of Shapira-Sargent who studied random walks on $X_{2,3}$.
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