On induced representations distinguished by orthogonal groups (Q2861286)

The author studies irreducible parabolically induced representations of a general linear group over a \(p\)-adic field \(F\) which are distinguished by an orthogonal group \(H\) that is, which admit a nonzero \(H\)-invariant linear form. He proves that such a representation whose inducing data is supercuspidal, is necessarily induced by a supercuspidal representation which is distinguished by an appropriate orthogonal group (Theorem 1.1). In case of irreducible principal series, he characterizes the \(H\)-distinguished ones by a condition on the kernel of the inducing character (Theorem 1.3). The proofs use methods and results of \(p\)-adic harmonic analysis on symmetric spaces as developed by \textit{P. Blanc} and \textit{P. Delorme} [Ann. Inst. Fourier 58, No. 1, 213--261 (2008; Zbl 1151.22012)].