On a stability of higher level Coxeter unipotent representations
Abstract
Let G be a connected reductive group over O, a complete discrete valuation ring with finite residue field Fq. Let RTr,Urθ be a level r Deligne--Lusztig representation of G(O), where r is a positive integer. We show that, if q is not small, and if T is Coxeter and θ=1, then RTr,Ur1 degenerates to the r=1 case. For G=GL2 (or SL2), as an application we give the dimensions and decompositions of all RTr,Urθ for Coxeter T. This in turn leads us to state a conjectural sign formula for RTr,Urθ, for general (G, T, θ,r).
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