Star reducible Coxeter groups

Abstract

We define ``star reducible'' Coxeter groups to be those Coxeter groups for which every fully commutative element (in the sense of Stembridge) is equivalent to a product of commuting generators by a sequence of length-decreasing star operations (in the sense of Lusztig). We show that the Kazhdan--Lusztig bases of these groups have a nice projection property to the Temperley--Lieb type quotient, and furthermore that the images of the basis elements C'w (for fully commutative w) in the quotient have structure constants in Z≥ 0[v, v-1]. We also classify the star reducible Coxeter groups and show that they form nine infinite families (types An, Bn, Dn, En, Fn, Hn, affine An-1 for n odd, affine Cn-1 for n even, and the case where the Coxeter graph is complete), with two exceptional cases (of ranks 6 and 7). This paper is the sequel to math.QA/0509362.

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