Minimal dimension of faithful representations for p-groups

Abstract

For a group G, we denote by mfaithful(G), the smallest dimension of a faithful complex representation of G. Let F be a non-Archimedean local field with the ring of integers O and the maximal ideal p. In this paper, we compute the precise value of mfaithful(G) when G is the Heisenberg group over O/pn. We then use the Weil representation to compute the minimal dimension of faithful representations of the group of unitriangular matrices over O/pn and many of its subgroups. By a theorem of Karpenko and Merkurjev, our result yields the precise value of the essential dimension of the latter finite groups.