实向量空间及相关概念

IF 1 Q1 MATHEMATICS Formalized Mathematics Pub Date : 2021-09-01 DOI:10.2478/forma-2021-0012
Kazuhisa Nakasho, Hiroyuki Okazaki, Y. Shidama
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引用次数: 2

摘要

总结。本文讨论了有限维向量空间及相关空间中存在的性质。在Mizar语言[1],[2]中,变量是严格类型的,它们的类型转换需要一个复杂的过程。我们的目的是形式化有限维向量空间的一些性质在类型变换中保持不变,并将类型变换的复杂性包含在本文中。具体来说,我们证明了在F Real上的TOP-REAL(n)、Real - ns (n)和n- vectsp之间的类型转换中,代数结构、子集、有限序列及其和、线性组合、线性无关和仿射无关等性质是保持不变的。我们在形式化中引用了[4]、[9]和[8]。
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Real Vector Space and Related Notions
Summary. In this paper, we discuss the properties that hold in finite dimensional vector spaces and related spaces. In the Mizar language [1], [2], variables are strictly typed, and their type conversion requires a complicated process. Our purpose is to formalize that some properties of finite dimensional vector spaces are preserved in type transformations, and to contain the complexity of type transformations into this paper. Specifically, we show that properties such as algebraic structure, subsets, finite sequences and their sums, linear combination, linear independence, and affine independence are preserved in type conversions among TOP-REAL(n), REAL-NS(n), and n-VectSp over F Real. We referred to [4], [9], and [8] in the formalization.
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来源期刊
Formalized Mathematics
Formalized Mathematics MATHEMATICS-
自引率
0.00%
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审稿时长
10 weeks
期刊介绍: Formalized Mathematics is to be issued quarterly and publishes papers which are abstracts of Mizar articles contributed to the Mizar Mathematical Library (MML) - the basis of a knowledge management system for mathematics.
期刊最新文献
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