On the Properties of Quasi-Banach Function Spaces

Aleš Nekvinda, Dalimil Peša
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Abstract

In this paper we explore some basic properties of quasi-Banach function spaces which are important in applications. Namely, we show that they possess a generalised version of Riesz–Fischer property, that embeddings between them are always continuous, and that the dilation operator is bounded on them. We also provide a characterisation of separability for quasi-Banach function spaces over the Euclidean space. Furthermore, we extend the classical Riesz–Fischer theorem to the context of quasinormed spaces and, as a consequence, obtain an alternative proof of completeness of quasi-Banach function spaces.

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论准巴拿赫函数空间的性质
本文探讨了准巴拿赫函数空间的一些基本性质,这些性质在应用中非常重要。也就是说,我们证明了准巴拿赫函数空间具有广义版的里斯兹-费舍尔性质,它们之间的嵌入总是连续的,而且扩张算子在它们上是有界的。我们还提供了欧几里得空间上准巴拿赫函数空间的可分性特征。此外,我们还将经典的里厄斯-费舍尔定理扩展到准规范空间,并由此获得了准巴拿赫函数空间完备性的另一种证明。
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