On Multilinear Forms for Mod p Representations of GL2(Qp)

Abstract

Motivated by the study of trilinear forms for complex representations, we investigate the space of G-invariant linear forms on tensor products of irreducible admissible representations of G = GL2(Qp) over Fp. Our main result is a complete vanishing theorem: for any n 1 and n infinite-dimensional irreducible admissible representations π1,…,πn of G, \[ HomG(π1 ·s πn, 1) = 0. \] A refined version holds for B+ := pmatrix pZ & Qp \\ 0 & 1 pmatrix-invariant forms when at least one πi is supersingular. The proof proceeds by a detailed analysis of certain subgroups, reducing the problem from G to B+ and ultimately to the representation theory of Zp. We also deduce partial extensions of the result to GL2(F) for finite extensions F/Qp.