On relative cuspidality
Abstract
Let (G,H) be a symmetric pair of reductive groups over a p-adic field with p≠ 2, attached to the involution θ. Under the assumption that there exists a maximally θ-split torus in G, which is anisotropic modulo its intersection with the split component of G, we extend Beuzart-Plessis' proof of existence of cuspidal representations, and prove that G(F) admits strongly relatively cuspidal representations. This confirms expectations of Kato and Takano.
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