Let k be a finite extension of Q_p, let G be an absolutely simple split reductive group over k, and let K be a maximal unramified extension of k. To each point in the Bruhat-Tits building of G_K, Moy and Prasad have attached a filtration of G(K) by bounded subgroups. In this paper we give necessary and sufficient conditions for the dual of the first Moy-Prasad filtration quotient to contain stable vectors for the action of the reductive quotient. Our work extends earlier results by Reeder and Yu, who gave a classification in the case when p is sufficiently large. By passing to a finite unramified extension of k if necessary, we obtain new supercuspidal representations of G(k).
翻译:让 k 成为 ⁇ p 的有限延伸, 让 G 成为绝对简单的分解消化组, 让 K 成为最大无限制的 k 扩展组 。 在Bruhat- Tits 建筑 G_ K, Moy 和 Prasad 的每一个点上, 都用捆绑的分组对 G( K) 进行过滤。 在本文件中, 我们为第一个摩- 普拉萨过滤商数的双倍提供了必要和充分的条件, 以包含稳定的矢量, 用于进行再消化商。 我们的工作延续了Reeder 和 Yu 的早期结果, 后者在p 足够大的情况下给出了分类 。 如果必要的话, 我们通过有限、 未简化的 k 扩展, 我们获得了 G( k) 新的超震荡性表示 。
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