Representations of GLn(D) near the identity

Abstract

For a central division algebra D of dimension d2 over a finite extension F of Qp or of Fp((t)), a field R of characteristic prime to p, and an irreducible smooth R-representation π of G=GLn(D), we show that for small enough compact open pro-p subgroup K of G, the restriction of π to K is the same as that of a virtual representation Σ cπ(λ) IndPλG 1, where the sum is over partitions λ of n and Pλ a parabolic subgroup of G associated to λ. When K is a Moy-Prasad subgroup of G we determine from the cπ(λ) a polynomial Pπ,K of degree d(π) independent of the choice of K, such that for large enough integers j the dimension of the points of π fixed under the congruence subgroup Kj of K is Pπ,K(qj) where q is the cardinality of the residue field of D.