Formal degree of principal series of quasi-split groups

Abstract

Let G be a quasi-split connected reductive group over a non-archimedean local field F. In this paper, we prove the formal degree conjecture for discrete series representations contained in a principal series of G(F). We first construct a type for each Bernstein component attached to a principal series representation of G(F). We then use these types and the local Langlands correspondence for principal series representations defined in [Sol25] to verify the formal degree conjecture. Our approach follows a similar strategy to [Ric25], reducing the problem to the case of unipotent representations of some other quasi-split group.