The Poisson-Fourier Transform for bicrossed products I: Abelian approximations and the quantum duality principle

Abstract

The quantum duality Principle of Drinfel'd states that any quantization G of a Poisson-Lie group G should be dual as a quantum group to a quantization G* of the Poisson dual group G*\!\!. In this paper we consider pairs (G = G V, G* = H W) with V, W abelian, where we can realise the quantizations G and G* as a bicrossed product between G and H in the setting of locally compact quantum groups. Assuming the existence of suitable maps ηG : G W and ηH : H V which we call abelian approximations, we implement the quantum duality principle by constructing an explicit unitary operator FG : L2(G) L2(G*), the Poisson-Fourier transform between G and G*. It induces an isomorphism of locally compact quantum group FG : G G*. After discussing the general framework for the Poisson-Fourier transform, we present several classes of examples of this phenomenon.

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