English

Monomial convergence on $\ell_r$

Complex Variables 2021-05-19 v1 Functional Analysis

Abstract

For 1<r21 < r \le 2, we study the set of monomial convergence for spaces of holomorphic functions over r\ell_r. For Hb(r) H_b(\ell_r), the space of entire functions of bounded type in r\ell_r, we prove that \mboxmonHb(r)\mbox{mon} H_b(\ell_r) is exactly the Marcinkiewicz sequence space mΨrm_{\Psi_r} where the symbol Ψr\Psi_r is given by Ψr(n):=log(n+1)11r\Psi_r(n) := \log(n + 1)^{1 - \frac{1}{r}} for nN0n \in \mathbb N_0. For the space of mm-homogeneous polynomials on r\ell_r, we prove that the set of monomial convergence \mboxmonP(mr)\mbox{mon} \mathcal P (^m \ell_r) contains the sequence space q\ell_{q} where q=(mr)q=(mr')'. Moreover, we show that for any qs<q\leq s<\infty, the Lorentz sequence space q,s\ell_{q,s} lies in \mboxmonP(mr)\mbox{mon} \mathcal P (^m \ell_r), provided that mm is large enough. We apply our results to make an advance in the description of the set of monomial convergence of H(Br)H_{\infty}(B_{\ell_r}) (the space of bounded holomorphic on the unit ball of r\ell_r). 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

R2 v1 2026-06-23T09:04:48.789Z