Monomial convergence on $\ell_r$
Abstract
For , we study the set of monomial convergence for spaces of holomorphic functions over . For , the space of entire functions of bounded type in , we prove that is exactly the Marcinkiewicz sequence space where the symbol is given by for . For the space of -homogeneous polynomials on , we prove that the set of monomial convergence contains the sequence space where . Moreover, we show that for any , the Lorentz sequence space lies in , provided that is large enough. We apply our results to make an advance in the description of the set of monomial convergence of (the space of bounded holomorphic on the unit ball of ). As a byproduct we close the gap on certain estimates related with the \emph{mixed} unconditionality constant for spaces of polynomials over classical sequence spaces.
Cite
@article{arxiv.1905.05081,
title = {Monomial convergence on $\ell_r$},
author = {Daniel Galicer and Martín Mansilla and Santiago Muro and Pablo Sevilla-Peris},
journal= {arXiv preprint arXiv:1905.05081},
year = {2021}
}
Comments
40 pages