Gelfand-Kirillov dimension for mod p representations of p-adic unitary groups of rank 2

Abstract

Let p be a prime number and F/F+ a CM extension of a totally real field such that every place of F+ above p is unramified and inert in F. We fix a finite place v of F+ above p, and let r: Gal(F+/F+) CU1,1(Fp) be a modular L-parameter valued in the C-group of a rank 2 unitary group associated to F/F+. We assume r is semisimple and sufficiently generic at v. Using recent results of Breuil--Herzig--Hu--Morra--Schraen along with our previous work, we prove that certain admissible smooth Fp-representations of the p-adic unitary group U1,1(F+v) associated to r in spaces of mod p automorphic forms have Gelfand--Kirillov dimension [F+v:Qp].