On typical representations for depth-zero components of split classical groups

Abstract

Let G be a split classical group over a non-Archimedean local field F with the cardinality of the residue field qF>5. Let M be the group of F-points of a Levi factor of a proper F-parabolic subgroup of G. Let [M, σM]M be an inertial class such that σM contains a depth-zero Moy--Prasad type of the form (KM, τM), where KM is a hyperspecial maximal compact subgroup of M. Let K be a hyperspecial maximal compact subgroup of G(F) such that K contains KM. In this article, we classify s-typical representations of K. In particular, we show that the s-typical representations of K are precisely the irreducible subrepresentations of ∈dJKλ, where (J, λ) is a level-zero G-cover of (K M, τM).