可分离希尔伯特空间中类似可分离向量的积分结果

Foundations Pub Date : 2022-09-19 DOI:10.3390/foundations2030055

R. Agarwal, Asif R Khan, Sumayyah Saadi

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引用次数: 0

摘要

在这项工作中，我们在可分离希尔伯特空间中使用类似的可分离向量来提供与多数化、涅兹哥达和Ćebysév型不等式相关的广义积分结果。接下来，我们给出这些不等式的一些改进。在这项工作中得到的定理扩展和改进了文献中几个已知的结果。我们工作的一个重要方面是，这些不等式与算术、几何、谐波和幂方法直接相关。自过去2600年以来，这些手段在许多艺术和科学分支中发挥了重要作用。

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Integral Results Related to Similarly Separable Vectors in Separable Hilbert Spaces

In this work, we use similarly separable vectors in separable Hilbert spaces to provide generalized integral results related to majorization, Niezgoda, and Ćebysév type inequalities. Next, we furnish some refinements of these inequalities. Theorems obtained in this work extend and improve several known results in the literature. An important aspect of our work is that these inequalities are directly related to Arithmetic, Geometric, Harmonic, and Power means. These means have played an important role in many branches of arts and sciences since the last 2600 years.

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Foundations

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