On Lusztig's asymptotic Hecke algebra for SL2

Abstract

Let H be the Iwahori-Hecke algebra and let J be Lusztig's asymptotic Hecke algebra, both specialized to type A1. For SL2, when the parameter q is specialized to a prime power, Braverman and Kazhdan showed recently that a completion of H has codimension two as a subalgebra of a completion of J, and described a basis for the quotient in spectral terms. In this note we write these functions explicitly in terms of the basis \tw\ of J, and further invert the canonical isomorphism between the completions of H and J, obtaining explicit formulas for the each basis element tw in terms of the basis \Tw\ of H. We conjecture some properties of this expansion for more general groups. We conclude by using our formulas to prove that J acts on the Schwartz space of the basic affine space of SL2, and produce some formulas for this action.