The Hecke-Baxter operators via Heisenberg group extensions
Abstract
The GL+1(R) Hecke-Baxter operator was introduced as an element of the O+1-spherical Hecke algebra associated with the Gelfand pair O+1⊂ GL+1(R). It was specified by the property to act on an O+1-fixed vector in a GL+1(R)-principal series representation via multiplication by the local Archimedean L-factor canonically attached to the representation. In this note we propose another way to define the Hecke-Baxter operator, identifying it with a generalized Whittaker function for an extension of the Lie group GL+1(R)× GL+1(R) by a Heisenberg Lie group. We also show how this Whittaker function can be lifted to a matrix element of an extension of the Lie group Sp2+2(R)× Sp2+2(R) by a Heisenberg Lie group.
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