English

Sparse Lerner operators in infinite dimensions

Functional Analysis 2022-05-05 v4

Abstract

We use the principle of almost orthogonality to give a new and simple proof that a sparse Lerner operator is bounded on a matrix- or operator-weighted space LW2(μ)L_W^{2}(\mu), where μ\mu is a doubling measure on Rd\R^d if and only if the weight WW satisfies the Muckenhoupt A2(μ)A_2(\mu)-condition, restricted to the sparse collection in question. Our method extends to the infinite-dimensional setting, thus allowing for applications to the multi-parameter setting. For the class of Muckenhoupt A2A_2-weights, we obtain bounds in terms of mixed A2(μ)A_{2}(\mu)-A(μ)A_{\infty}(\mu)-conditions, which is independent of dimension and agrees with the best known bound in the finite-dimensional vectorial setting. As an application, we prove a matrix-weighted bound for the maximal Bergman projection, where we obtain a new sharper bound in terms of the B\'ekoll\'e-Bonami characteristic. Furthermore, we consider commutators of sparse Lerner operators on operator-valued weighted L2L^{2}-spaces and some applications to multi-parameters

Keywords

Cite

@article{arxiv.2103.17005,
  title  = {Sparse Lerner operators in infinite dimensions},
  author = {Adem Limani and Sandra Pott},
  journal= {arXiv preprint arXiv:2103.17005},
  year   = {2022}
}

Comments

29 pages

R2 v1 2026-06-24T00:43:53.127Z