Embeddings between weighted Copson and Ces\`{a}ro function spaces

TL;DR

This paper characterizes embeddings between weighted Copson and Cesàro function spaces, providing two-sided estimates for the optimal constant in the inequality, allowing different parameters and weights, using duality and Hardy-type inequalities.

Contribution

It introduces a novel analysis of embeddings between weighted Copson and Cesàro spaces with different parameters and weights, expanding the understanding of these function space relationships.

Findings

Derived two-sided estimates for the embedding constant c.

Allowed different parameters p1, p2 and weights v1, v2 in the analysis.

Reduced the problem to Hardy-type inequalities solutions.

Abstract

In this paper embeddings between weighted Copson function spaces ${\operatorname{Cop}}_{p_1,q_1}(u_1,v_1)$ and weighted Ces\`{a}ro function spaces ${\operatorname{Ces}}_{p_2,q_2}(u_2,v_2)$ are characterized. In particular, two-sided estimates of the optimal constant $c$ in the inequality \begin{equation*} \bigg( \int_0^{\infty} \bigg( \int_0^t f(\tau)^{p_2}v_2(\tau)\,d\tau\bigg)^{\frac{q_2}{p_2}} u_2(t)\,dt\bigg)^{\frac{1}{q_2}} \le c \bigg( \int_0^{\infty} \bigg( \int_t^{\infty} f(\tau)^{p_1} v_1(\tau)\,d\tau\bigg)^{\frac{q_1}{p_1}} u_1(t)\,dt\bigg)^{\frac{1}{q_1}}, \end{equation*} where $p_1,\,p_2,\,q_1,\,q_2 \in (0,\infty)$, $p_2 \le q_2$ and $u_1,\,u_2,\,v_1,\,v_2$ are weights on $(0,\infty)$, are obtained. The most innovative part consists of the fact that possibly different parameters $p_1$ and $p_2$ and possibly different inner weights $v_1$ and $v_2$ are allowed. The proof is based on the combination duality techniques with estimates of optimal constants of the embeddings between weighted Ces\`{a}ro and Copson spaces and weighted Lebesgue spaces, which reduce the problem to the solutions of the iterated Hardy-type inequalities.