Summability of multilinear forms on classical sequence spaces
Abstract
We present an extension of the Hardy--Littlewood inequality for multilinear forms. More precisely, let be the real or complex scalar field and be positive integers with and be positive integers such that . () If then there is a constant (not depending on ) such that \left( \sum_{i_{1},\dots ,i_{k}=1}^{n}\left| T\left( e_{i_{1}}^{n_{1}},\dots ,e_{i_{k}}^{n_{k}}\right) \right| ^{r}\right) ^{% \frac{1}{r}}\leq D_{m,r,p,k}^{\mathbb{K}} \cdot n^{max\left\{ \frac{% 2kp-kpr-pr+2rm}{2pr},0\right\} }\left| T\right| for all -linear forms and all positive integers . Moreover, the exponent is optimal. () If then there is a constant (not depending on ) such that \left( \sum_{i_{1},\dots ,i_{k}=1}^{n }\left| T\left( e_{i_{1}}^{n_{1}},\dots ,e_{i_{k}}^{n_{k}}\right) \right| ^{r }\right) ^{% \frac{1}{r }}\leq D_{m,r,p, k}^{\mathbb{K}} \cdot n^{ max \left\{\frac{% p-rp+rm}{pr}, 0\right\}}\left| T\right| for all -linear forms and all positive integers . Moreover, the exponent is optimal. The case recovers a recent result due to G. Araujo and D. Pellegrino.
Cite
@article{arxiv.1604.01610,
title = {Summability of multilinear forms on classical sequence spaces},
author = {Tony Nogueira and Pilar Rueda},
journal= {arXiv preprint arXiv:1604.01610},
year = {2016}
}