Dilation-commuting operators on power-weighted Orlicz classes
Abstract
Let and be nondecreasing functions from onto itself. For and , define the Orlicz class to be the set of Lebesgue-measurable functions on such that \begin{equation*} \int_{\mathbb{R_+}} \Phi_{i} \left( k|(Tf)(t)| \right) t^{\gamma}dt < \infty \end{equation*} for some . Our goal in this paper is to find conditions on , , and an operator so that the assertions \begin{equation} T : L_{\Phi_2,t^{\gamma}}(\mathbb{R_+}) \rightarrow L_{\Phi_1,t^{\gamma}}(\mathbb{R_+}), \tag{I} \end{equation} and \begin{equation}\label{modularA} \int_{\mathbb{R_+}} \Phi_1 \left( |(Tf)(t)| \right)t^{\gamma}dt \leq K \int_{\mathbb{R_+}} \Phi_2 \left( K|f(s)| \right)s^{\gamma}ds, \tag{M} \end{equation} in which is independent of , say, simple on , are equivalent and to then find necessary and sufficient conditions in order that (\ref{modularA}) holds.
Keywords
Cite
@article{arxiv.1708.01478,
title = {Dilation-commuting operators on power-weighted Orlicz classes},
author = {Ron Kerman and Rama Rawat and Rajesh K. Singh},
journal= {arXiv preprint arXiv:1708.01478},
year = {2017}
}