Deligne-Lusztig Constructions for Division Algebras and the Local Langlands Correspondence

Abstract

Let K be a local non-Archimedean field of positive characteristic and let L be the degree-n unramified extension of K. Via the local Langlands and Jacquet-Langlands correspondences, to each sufficiently generic multiplicative character of L, one can associate an irreducible representation of the multiplicative group of the central division algebra D of invariant 1/n over K. In 1979, Lusztig proposed a cohomological construction of supercuspidal representations of reductive p-adic groups analogous to Deligne-Lusztig theory for finite reductive groups. In this paper we prove that when n=2, the p-adic Deligne-Lusztig (ind-)scheme X induces a correspondence between smooth one-dimensional representations of L× and representations of D× that matches the correspondence given by the LLC and JLC.