Lebesgue boundedness of Riesz potential for (𝑘, 1)-generalized Fourier transform with radial piecewise power weights

In spaces with weight |𝑥|−1𝑣𝑘(𝑥), where 𝑣𝑘(𝑥) is the Dunkl weight, there is the (𝑘, 1)- generalized Fourier transform. Harmonic analysis in these spaces is important, in particular, in problems of quantum mechanics. Recently, for the (𝑘, 1)-generalized Fourier transform, the
Riesz potential was defined and the (𝐿𝑝,𝐿𝑞)-inequality with radial power weights was proved for it, which is an analogue of the well-known Stein–Weiss inequality for the classical Riesz potential and the Dunkl–Riesz potential. In the paper, this result is generalized to the case of radial piecewise power weights. Previously, a similar inequality was proved for the Dunkl–Riesz potential.

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