On some non-principal locally analytic representations induced by cuspidal Lie algebra representations
Abstract
Let G be a split reductive p-adic Lie group. This paper is the first in a series on the construction of locally analytic G-representations which do not lie in the principal series. Here we consider the case of the general linear group G=GLn+1 and locally analytic representations which are induced by cuspidal modules of the Lie algebra. We prove that they are ind-admissible and satisfy the homological vanishing criterion in the definition of supercuspidality in the sense of Kohlhaase.
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