# Schur multipliers on $\mathcal{B}(L^p,L^q)$

**Authors:** Cl\'ement Coine

arXiv: 1703.08128 · 2017-03-24

## TL;DR

This paper characterizes Schur multipliers on operators between L^p and L^q spaces, extending classical definitions and providing new insights into their structure and inclusion relationships.

## Contribution

It introduces a new characterization of Schur multipliers on (L^p,L^q) spaces for 1 < q t p < t, generalizing classical cases.

## Key findings

- Characterization of Schur multipliers via Bochner space representations.
- Extension of Schur multiplier definitions to measure spaces.
- New inclusion relationships between Schur multiplier spaces.

## Abstract

Let $(\Omega_1, \mathcal{F}_1, \mu_1)$ and $(\Omega_2, \mathcal{F}_2, \mu_2)$ be two measure spaces and let $1 \leq p,q \leq +\infty$. We give a definition of Schur multipliers on $\mathcal{B}(L^p(\Omega_1), L^q(\Omega_2))$ which extends the definition of classical Schur multipliers on $\mathcal{B}(\ell_p,\ell_q)$. Our main result is a characterization of Schur multipliers in the case $1\leq q \leq p \leq +\infty$. When $1 < q \leq p < +\infty$, $\phi \in L^{\infty}(\Omega_1 \times \Omega_2)$ is a Schur multiplier on $\mathcal{B}(L^p(\Omega_1), L^q(\Omega_2))$ if and only if there are a measure space (a probability space when $p\neq q$) $(\Omega,\mu)$, $a\in L^{\infty}(\mu_1, L^{p}(\mu))$ and $b\in L^{\infty}(\mu_2, L^{q'}(\mu))$ such that, for almost every $(s,t) \in \Omega_1 \times \Omega_2$, $$\phi(s,t)=\left\langle a(s), b(t) \right\rangle.$$ Here, $L^{\infty}(\mu_1, L^{r}(\mu))$ denotes the Bochner space on $\Omega_1$ valued in $L^r(\mu)$. This result is new, even in the classical case. As a consequence, we give new inclusion relationships between the spaces of Schur multipliers on $\mathcal{B}(\ell_p,\ell_q)$.

## Full text

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1703.08128/full.md

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