English

Weighted inequalities for iterated Copson integral operators

Functional Analysis 2019-05-06 v2

Abstract

We solve a long-standing open problem in theory of weighted inequalities concerning iterated Copson operators. We use a constructive approximation method based on a new discretization principle that is developed here. In result, we characterize all weight functions w,v,uw,v,u on (0,)(0,\infty) for which there exists a constant CC such that the inequality (0(t(sh(y)dy)mu(s)ds)qmw(t)dt)1qC(0h(t)pv(t)dt)1p \left(\int_0^{\infty}\left(\int_t^\infty \left(\int_s^{\infty}h(y)\,\text{d}y\right)^mu(s) \,\text{d}s\right)^{\frac{q}{m}}w(t)\,\text{d}t\right)^{\frac{1}{q}} \le C \left(\int_0^{\infty}h(t)^pv(t)\,\text{d}t\right)^{\frac{1}{p}} holds for every non-negative measurable function hh on (0,)(0,\infty), where p,qp,q and mm are positive parameters. We assume that p1p\geq 1 but otherwise p,qp,q and mm are unrestricted.

Keywords

Cite

@article{arxiv.1806.04909,
  title  = {Weighted inequalities for iterated Copson integral operators},
  author = {Martin Křepela and Luboš Pick},
  journal= {arXiv preprint arXiv:1806.04909},
  year   = {2019}
}
R2 v1 2026-06-23T02:28:21.090Z