plicker嵌入表示$$\text {PU}(1,n)$$离散子群的极限集

Pub Date : 2023-12-02 DOI:10.1007/s00031-023-09829-w
Haremy Zuñiga
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引用次数: 0

摘要

设\(\Gamma \)为\(\text {PU}(1,n)\)的离散子群。在这项工作中,我们通过plicker嵌入来研究\(\Gamma \)对投影空间\(\mathbb {P}(\wedge ^{k+1}\mathbb {C}^{n+1})\)的诱导作用,其中\(\wedge ^{k+1}\)表示外部功率。我们为这个动作定义了一个极限集,称为k-Chen-Greenberg极限集,它扩展了Chen-Greenberg极限集的经典定义\(L(\Gamma )\),并展示了它的几个性质。我们证明了它的Kulkarni极限集是由包含p或包含在\(p^{\perp }\)中的所有k-平面生成的射影子空间的所有\(p\in L(\Gamma )\)的并集。我们还证明了两个极限集之间的对偶性。
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The Limit Set for Representations of Discrete Subgroups of $$\text {PU}(1,n)$$ by the Plücker Embedding

Let \(\Gamma \) be a discrete subgroup of \(\text {PU}(1,n)\). In this work, we look at the induced action of \(\Gamma \) on the projective space \(\mathbb {P}(\wedge ^{k+1}\mathbb {C}^{n+1})\) by the Plücker embedding, where \(\wedge ^{k+1}\) denotes the exterior power. We define a limit set for this action called the k-Chen-Greenberg limit set, which extends the classical definition of the Chen-Greenberg limit set \(L(\Gamma )\), and we show several of its properties. We prove that its Kulkarni limit set is the union taken over all \(p\in L(\Gamma )\) of the projective subspace generated by all k-planes that contain p or are contained in \(p^{\perp }\) via the Plücker embedding. We also prove a duality between both limit sets.

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