2019 Bases in the spaces of homogeneous polynomials and multilinear operators on Banach spaces
Donghai Ji, Qingying Bu
Rocky Mountain J. Math. 49(6): 1829-1842 (2019). DOI: 10.1216/RMJ-2019-49-6-1829

Abstract

For Banach spaces $E_1, \dots ,E_m$, $E$ and $F$ with their bases, we show that a particular monomial sequence forms a basis of $\mathcal {P}(^mE; F)$, the space of continuous $m$-homogeneous polynomials from $E$ to $F$ (resp.\ a basis of $\mathcal {L}(E_1,\dots ,E_m;F)$, the space of continuous $m$-linear operators from $E_1\times \cdots \times E_m$ to $F$) if and only if the basis of $E$ (resp. the basis of $E_1,\dots ,E_m$) is a shrinking basis and every $P \in \mathcal {P}(^mE; F)$ (resp.\ every $T \in \mathcal {L}(E_1,\dots ,E_m;F)$) is weakly continuous on bounded sets.

Citation

Download Citation

Donghai Ji. Qingying Bu. "Bases in the spaces of homogeneous polynomials and multilinear operators on Banach spaces." Rocky Mountain J. Math. 49 (6) 1829 - 1842, 2019. https://doi.org/10.1216/RMJ-2019-49-6-1829

Information

Published: 2019
First available in Project Euclid: 3 November 2019

zbMATH: 07136580
MathSciNet: MR4027235
Digital Object Identifier: 10.1216/RMJ-2019-49-6-1829

Subjects:
Primary: 46G25
Secondary: 46B28 , 46M05

Keywords: homogeneous polynomials , monomial bases , multilinear operators , symmetric tensor products

Rights: Copyright © 2019 Rocky Mountain Mathematics Consortium

Vol.49 • No. 6 • 2019
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