The based ring the lowest generalized two-sided cell of an extended affine Weyl group

Abstract

Let c0 be the lowest generalized two-sided cell of an extended affine Weyl group W. We determine the structure of the based ring of c0. For this we show that certain conjectures of Lusztig on generalized cells (called P1-P15) hold for c0. As an application, we use the structure of the based ring to study certain simple modules of Hecke algebras of W with unequal parameters, namely those attached to c0. Also we give a set of prime ideals p of the center Z of the generic affine Hecke algebra H such that the reduced affine Hecke algebra kpH is simple over kp, where kp=Frac(Z/p) is the residue field of Z at p. In particular, we show that the algebra HZFrac(Z) is a split simple algebra over the field Frac(Z).