Denominators in Lusztig's asymptotic Hecke algebra via the Plancherel formula

Abstract

Let W be an extended affine Weyl group, H be the corresponding affine Hecke algebra over the ring C[q12, q-12], and J be Lusztig's asymptotic Hecke algebra, viewed as a based ring with basis \tw\. Viewing J as a subalgebra of the (q-12)-adic completion of H via Lusztig's map φ, we use Harish-Chandra's Plancherel formula for p-adic groups to show that the coefficient of Tx in tw is a rational function of q, with denominator depending only on the two-sided cell containing w, and dividing a power of the Poincar\'e polynomial of the finite Weyl group. As an application, we conjecture that these denominators encode more detailed information about the failure of the Kazhdan-Lusztig classification at roots of the Poincar\'e polynomial than is currently known. Along the way, we show that upon specializing q=q>1, the map from J to the Harish-Chandra Schwartz algebra is injective. As an application of injectivity, we give a novel criterion for an Iwahori-spherical representation to have fixed vectors under a larger parahoric subgroup in terms of its Kazhdan-Lusztig parameter.

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