Asymptotic lowest two-sided cell

Abstract

To a Coxeter system (W,S) (with S finite) and a weight function L : W is associated a partition of W into Kazhdan-Lusztig (left, right or two-sided) L-cells. Let S = \s ∈ S | L(s)=0\, S+=\s ∈ S | L(s) > 0\ and let C be a Kazhdan-Lusztig (left, right or two-sided) L-cell. According to the semicontinuity conjecture of the first author, there should exist a positive natural number m such that, for any weight function L' : W such that L(s+)=L'(s+) > m L'(s) for all s+ ∈ S+ and s ∈ S, C is a union of Kazhdan-Lusztig (left, right or two-sided) L'-cells. The aim of this paper is to prove this conjecture whenever (W,S) is an affine Weyl group and C is contained in the lowest two-sided L-cell.