%0 Journal Article
%T 模糊赋范Riesz空间上序列基本性质的研究
Research on the Basic Property of Sequence on Fuzzy Normed Riesz Space
%A 郑富丽
%A 刘艳丽
%J Pure Mathematics
%P 375-381
%@ 2160-7605
%D 2025
%I Hans Publishing
%R 10.12677/pm.2025.151038
%X 模糊赋范Riesz空间是一个既具有Riesz空间的序结构又具有模糊赋范空间的模糊范数结构的线性空间,它将Riesz空间(也称为向量格或向量格子)与模糊赋范空间的概念结合起来。在模糊赋范Riesz空间中,研究序列的收敛性、有界性和完备性是十分重要的。本文通过对序列性质的研究,给出了模糊赋范Riesz空间上模糊序闭集的概念,讨论了模糊Banach格中模糊范收敛和一致收敛的关系,并用序列的模糊范收敛和完备性来讨论模糊赋范Riesz空间上的相关性质,最后讨论了模糊Banach格中模糊序连续范数的充要条件,丰富和推广了已有结论。
A fuzzy normed Riesz space is a linear space that has both the order structure of a Riesz space and the fuzzy norm structure of a fuzzy normed space, which combines the concepts of a Riesz space (also known as a vector lattice or a vector lattice module) and a fuzzy endowed Riesz space. In a fuzzy normed Riesz space, the study of convergence, boundedness, and completeness of sequences is very important. In this paper, by studying the properties of sequences, the concept of a fuzzy order closed set in a fuzzy normed Riesz space is given, followed by a discussion of the relationship between fuzzy norm convergence and uniform convergence in a fuzzy Banach lattice and the use of sequence fuzzy norm convergence and completeness to discuss the differences and connections between a fuzzy normed Riesz space and a fuzzy Banach lattice, finally, the sufficient and necessary conditions for the fuzzy order continuous norm in the fuzzy Banach lattice are discussed, enriching and extending existing results.
%K 模糊赋范Riesz空间,
%K 模糊Banach格,
%K 模糊范收敛性
Fuzzy Normed Riesz Space
%K Fuzzy Banach Lattice
%K Fuzzy Normed Convergence
%U http://www.hanspub.org/journal/PaperInformation.aspx?PaperID=106685