Irreducible p-modular representations of unramified U(2,1)

Abstract

Let E/F be a unramified quadratic extension of non-archimedean local fields of odd characteristic p, and G be the unramified unitary group U(2, 1)(E/F). For an irreducible smooth representation π of G over Fp, with an underlying irreducible smooth representation σ of a maximal compact open subgroup K, we prove that π admits eigenvectors for an appropriate Hecke operator Tσ, and we classify those π with non-zero eigenvalues for Tσ by a tree argument; as a corollary, we show π is supersingular if and only if it is supercuspidal.