On relatively tempered representations for \(p\)-adic symmetric spaces (Q2283645)

This paper is is concerned with a generalization of the subrepresentation theorem for tempered representations. Let \(G\) be a connected reductive group over a non-Archimedean local field \(F\) of odd characteristic with an \(F\)-involution \(\theta\), and let \(H\) be a subgroup of \(\theta\)-fixed points of \(G\). A parabolic subgroup \(P\) of \(G\) has a decomposition of the form \(P=MU\), where \(M\) is a Levi factor of \(P\) and \(U\) is the unipotent radical. A representation \(\tau\) of \(M\) determines a representation \(\mathrm{Ind}^G_P \tau\) of \(G\) obtained by normalized parabolic induction. Let \((\pi,V)\) be an \((H,\lambda)\)-relatively tempered representation of \(G\) for some \(\lambda \in\mathrm{Hom}_H (\pi, \boldsymbol{1})\). The author proves that there is a nonzero \(G\)-intertwining map \(\pi \to\mathrm{Ind}^G_P \tau\), where \(P=MU\) is \(\theta\)-split and \(\tau\) is \(M^\theta\)-relatively square-integrable. For the entire collection see [Zbl 1414.11004].