The Fourier transform on the group GL2(R) and the action of the overalgebra gl4

Abstract

We define a kind of 'operational calculus' for GL2(R). Namely, the group GL2(R) can be regarded as an open dense chart in the Grassmannian of 2-dimensional subspaces in R4. Therefore the group GL4(R) acts in L2 on GL2(R). We transfer the corresponding action of the Lie algebra gl4 to the Plancherel decomposition of GL2(R), the Lie algebra acts by differential-difference operators with shifts in an imaginary direction. We also write similar formulas for the action of gl4 gl4 in the Plancherel decomposition of GL2(C)