Chebyshevskii Sbornik
 RUS  ENG JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB
 General information Latest issue Archive Search papers Search references RSS Latest issue Current issues Archive issues What is RSS

 Chebyshevskii Sb.: Year: Volume: Issue: Page: Find

 Chebyshevskii Sb., 2019, Volume 20, Issue 1, Pages 131–147 (Mi cheb722)

Weighted inequalities for Dunkl–Riesz potential

D. V. Gorbachev, V. I. Ivanov

Tula State University, Tula

Abstract: For the classical Riesz potential or the fractional integral $I_{\alpha}$, the Hardy–Littlewood– Sobolev–Stein–Weiss $(L^p, L^q)$-boundedness conditions with power weights are well known. Using the Fourier transform $\mathcal{F}$, the Riesz potential is determined by the equality $\mathcal{F}(I_{\alpha}f)(y)=$ $=|y|^{-\alpha}\mathcal{F}(f)(y)$. An important generalization of the Fourier transform became the Dunkl transform $\mathcal{F}_k(f)$, acting in Lebesgue spaces with Dunkl's weight, defined by the root system $R\subset \mathbb{R}^d$, its reflection group $G$ and a non-negative multiplicity function $k$ on $R$, invariant with respect to $G$. S. Thangavelu and Yu. Xu using the equality $\mathcal{F}_k (I_{\alpha}^kf)(y)=|y|^{-\alpha}\mathcal{F}_k(f)(y)$ determined the $D$-Riesz potential $I_{\alpha}^k$. For the $D$-Riesz potential, the boundedness conditions in Lebesgue spaces with Dunkl weight and power weights, similar to the conditions for the Riesz potential, were also proved. At the conference "Follow-up Approximation Theory and Function Spaces"   in the Centre de Recerca Matemàtica (CRM, Barcelona, 2017) M. L. Goldman raised the question about $(L_p,L_q)$-boundedness conditions of the D-Riesz potential with piecewise-power weights. Consideration of piecewise-power weights makes it possible to reveal the influence of the behavior of weights at zero and infinity on the boundedness of the $D$-Riesz potential. This paper provides a complete answer to this question. In particular, in the case of the Riesz potential, necessary and sufficient conditions are obtained. As auxiliary results, necessary and sufficient conditions for the boundedness of the Hardy and Bellman operators are proved in Lebesgue spaces with Dunkl weight and piecewise-power weights.

Keywords: Fourier transform, Riesz potential, Dunkl transform, D-Riesz potential.

 Funding Agency Grant Number Russian Science Foundation 18-11-00199 This Research was performed by a grant of Russian Science Foundation (project 18-11-00199).

DOI: https://doi.org/10.22405/2226-8383-2018-20-1-131-147

Full text: PDF file (685 kB)
References: PDF file   HTML file

UDC: 517.5
Accepted:10.04.2019

Citation: D. V. Gorbachev, V. I. Ivanov, “Weighted inequalities for Dunkl–Riesz potential”, Chebyshevskii Sb., 20:1 (2019), 131–147

Citation in format AMSBIB
\Bibitem{GorIva19} \by D.~V.~Gorbachev, V.~I.~Ivanov \paper Weighted inequalities for Dunkl--Riesz potential \jour Chebyshevskii Sb. \yr 2019 \vol 20 \issue 1 \pages 131--147 \mathnet{http://mi.mathnet.ru/cheb722} \crossref{https://doi.org/10.22405/2226-8383-2018-20-1-131-147} 

• http://mi.mathnet.ru/eng/cheb722
• http://mi.mathnet.ru/eng/cheb/v20/i1/p131

 SHARE:

Citing articles on Google Scholar: Russian citations, English citations
Related articles on Google Scholar: Russian articles, English articles

This publication is cited in the following articles:
1. D. V. Gorbachev, V. I. Ivanov, “Usloviya Makenkhauta dlya kusochno-stepennykh vesov v evklidovom prostranstve s meroi Danklya”, Chebyshevskii sb., 20:2 (2019), 82–92
•  Number of views: This page: 65 Full text: 21 References: 5