Twisted Fourier transforms on non-Kac compact quantum groups

Abstract

We introduce an analytic family of twisted Fourier transforms \F(x)p\x∈ R,p∈ [1,2) for non-Kac compact quantum groups and establish a sharpened form of the Hausdorff-Young inequality in the range 0≤ x ≤ 1. Furthermore, we prove that the range 0≤ x ≤ 1 is both necessary and sufficient for the boundedness of F(x)p under the assumption of sub-exponential growth on the dual discrete quantum group. We also show that the range of boundedness of F(x)p can be strictly extended beyond [0,1] for certain non-Kac and non-coamenable free orthogonal quantum groups. As applications, we derive a stronger form of the twisted rapid decay property for polynomially growing non-Kac discrete quantum groups, including the duals of the Drinfeld-Jimbo q-deformations, and construct an explicit contractive, but non-completely bounded, representation of the convolution algebra of any non-Kac free orthogonal quantum group.

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