Regular characters of classical groups over complete discrete valuation rings

Abstract

Let o be a complete discrete valuation ring with finide residue field k of odd characteristic, and let G be a symplectic or special orthogonal group scheme over o. For any ∈N let G denote the -th principal congruence subgroup of G(o). An irreducible character of the group G(o) is said to be regular if it is trivial on a subgroup G+1 for some , and if its restriction to G/G+1 Lie(G)(k) consists of characters of minimal G(k alg) stabilizer dimension. In the present paper we consider the regular characters of such classical groups over o, and construct and enumerate all regular characters of G(o), when the characteristic of k is greater than two. As a result, we compute the regular part of their representation zeta function.