凸共容对角线作用的刚性

arXiv - MATH - Metric Geometry Pub Date : 2024-08-06 DOI:arxiv-2408.03462

Subhadip Dey, Beibei Liu

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引用次数: 0

摘要

Kleiner-Leeb 和 Quint 证明，与秩 1 对称空间相比，高秩对称空间中的凸子集非常刚性。受此启发，我们考虑了适当 CAT(0) 空间 $X_1\times X_2$ 的乘积中的凸子集，并证明对于 $X_i$ 上的任意两个凸共容作用 $\rho_i(\Gamma)$，其中 $i=1, 2$、如果$\Gamma$通过$rho=（\rho_1, \rho_2）$对$X_1\times X_2$的对角作用也是凸共容的，那么在一个合适的条件下，$\rho_1(\Gamma)$和$\rho_2(\Gamma)$具有相同的标记长度谱。

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Rigidity of convex co-compact diagonal actions

Kleiner-Leeb and Quint showed that convex subsets in higher-rank symmetric spaces are very rigid compared to rank 1 symmetric spaces. Motivated by this, we consider convex subsets in products of proper CAT(0) spaces $X_1\times X_2$ and show that for any two convex co-compact actions $\rho_i(\Gamma)$ on $X_i$, where $i=1, 2$, if the diagonal action of $\Gamma$ on $X_1\times X_2$ via $\rho=(\rho_1, \rho_2)$ is also convex co-compact, then under a suitable condition, $\rho_1(\Gamma)$ and $\rho_2(\Gamma)$ have the same marked length spectrum.

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arXiv - MATH - Metric Geometry

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