The functorial source problem via dimension data

Abstract

For an automorphic representation π of Ramanujan type, there is a conjectural subgroup Hπ of the Langlands L-group LG associated to π, called the functional source of π. The functorial source problem proposed by Langlands and refined by Arthur intends to determine Hπ via analytic and arithmetic data of π. In this paper, we consider the functorial source problem of automorphic representations of a split group, a unitary group, or an orthogonal group which do not come from endoscopy and have minimal possible ramification. In this setting, Hπ must be an S-subgroup of LG. We approach the functorial source problem by proving distinction and linear independence among dimension data of S-subgroups. Nice results along this direction are shown in this paper. We define a notion of quasi root system and use it as the key tool for studying S-subgroups and their dimension data.