On the structure of modular principal series representations of GL2 over some finite rings

Abstract

The submodule structure of mod p principal series representations of GL2(k), for k a finite field of characteristic p, was described by Bardoe and Sin and has played an important role in subsequent work on the mod p local Langlands correspondence. The present paper studies the structure of mod p principal series representations of GL2(O / mn), where O is the ring of integers of a p-adic field F and m its maximal ideal. In particular, the multiset of Jordan-H\"older constituents is determined. In the case n = 2, more precise results are obtained. If F / Qp is totally ramified, the submodule structure of the principal series is determined completely. Otherwise the submodule structure is infinite. When F is ramified but not totally ramified, the socle and radical filtrations are determined and a specific family of submodules, providing a filtration of the principal series with irreducible quotients, is studied; this family is closely related to the image of a functor of Breuil. In the case of unramified F, the structure of a particular submodule of the principal series is studied; this provides a more precise description of the structure of a module constructed by Breuil and Pask\=unas in the context of their work on diagrams giving rise to supersingular mod p representations of GL2(F).

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