English

Maximal operators on the infinite-dimensional torus

Classical Analysis and ODEs 2021-09-16 v3

Abstract

We study maximal operators related to bases on the infinite-dimensional torus Tω\mathbb{T}^\omega. {For the normalized Haar measure dxdx on Tω\mathbb{T}^\omega it is known that MR0M^{\mathcal{R}_0}, the maximal operator associated with the dyadic basis R0\mathcal{R}_0, is of weak type (1,1)(1,1), but MRM^{\mathcal{R}}, the operator associated with the natural general basis R\mathcal{R}, is not. We extend the latter result to all q[1,)q \in [1,\infty). Then we find a wide class of intermediate bases R0RR\mathcal{R}_0 \subset \mathcal{R}' \subset \mathcal{R}, for which maximal functions have controlled, but sometimes very peculiar behavior.} Precisely, for given q0[1,)q_0 \in [1, \infty) we construct R\mathcal{R}' such that MRM^{\mathcal{R}'} is of restricted weak type (q,q)(q,q) if and only if qq belongs to a predetermined range of the form (q0,](q_0, \infty] or [q0,][q_0, \infty]. Finally, we study the weighted setting, considering the Muckenhoupt ApR(Tω)A_p^\mathcal{R}(\mathbb{T}^\omega) and reverse H\"older RHrR(Tω)\mathrm{RH}_r^\mathcal{R}(\mathbb{T}^\omega) classes of weights associated with R\mathcal{R}. For each p(1,)p \in (1, \infty) and each wApR(Tω)w \in A_p^\mathcal{R}(\mathbb{T}^\omega) we obtain that MRM^{\mathcal{R}} is not bounded on Lq(w)L^q(w) in the whole range q[1,)q \in [1,\infty). Since we are able to show that p(1,)ApR(Tω)=r(1,)RHrR(Tω), \bigcup_{p \in (1, \infty)}A_p^\mathcal{R}(\mathbb{T}^\omega) = \bigcup_{r \in (1, \infty)} \mathrm{RH}_r^\mathcal{R}(\mathbb{T}^\omega), the unboundedness result applies also to all reverse H\"older weights.

Keywords

Cite

@article{arxiv.2109.04811,
  title  = {Maximal operators on the infinite-dimensional torus},
  author = {Dariusz Kosz and Javier Martínez Perales and Victoria Paternostro and Ezequiel Rela and Luz Roncal},
  journal= {arXiv preprint arXiv:2109.04811},
  year   = {2021}
}
R2 v1 2026-06-24T05:51:26.448Z