软有理线积分

Pub Date : 2021-12-01 DOI:10.35634/vm210404
S. Acharjee, D. Molodtsov
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引用次数: 1

摘要

软集理论是处理不确定性的数学新领域。软集理论广泛应用于科学和社会科学的各个领域,如决策、计算机科学、模式识别、人工智能等。数学分析的软集理论版本的重要性已经在计算机科学的几个领域得到了体现。本文提出了函数的软梯度和经典分析中类似于线积分的软积分的概念。建立了软梯度的基本性质。给出了一个充要条件,使一个集合可以是某函数的软梯度的子集。证明了软积分中包含软梯度。建立了软积分的半可加性和正均匀性。对软积分及其分段的大小进行了估计。证明了关于积分上限的半可加性。此外,本文还丰富了软有理线积分及其相关领域的理论发展,以提高计算系统的功能。
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Soft rational line integral
Soft set theory is a new area of mathematics that deals with uncertainties. Applications of soft set theory are widely spread in various areas of science and social science viz. decision making, computer science, pattern recognition, artificial intelligence, etc. The importance of soft set-theoretical versions of mathematical analysis has been felt in several areas of computer science. This paper suggests some concepts of a soft gradient of a function and a soft integral, an analogue of a line integral in classical analysis. The fundamental properties of soft gradients are established. A necessary and sufficient condition is found so that a set can be a subset of the soft gradient of some function. The inclusion of a soft gradient in a soft integral is proved. Semi-additivity and positive uniformity of a soft integral are established. Estimates are obtained for a soft integral and the size of its segment. Semi-additivity with respect to the upper limit of integration is proved. Moreover, this paper enriches the theoretical development of a soft rational line integral and associated areas for better functionality in terms of computing systems.
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