MATHEMATICAL THEORY OF k MULTIPLIER

Applied Mathematics and Mechanics (English Edition) ›› 2000, Vol. 21 ›› Issue (3): 347-354.

MATHEMATICAL THEORY OF k MULTIPLIER

杨文熊

Department of Engineering Mechanics, Shanghai Jiaotong University, Shanghai 200030, P.R.China

收稿日期:1998-11-03 修回日期:1999-10-25 出版日期:2000-03-18 发布日期:2000-03-18
通讯作者: He Fubao

MATHEMATICAL THEORY OF k MULTIPLIER

Yang Wenxiong

Department of Engineering Mechanics, Shanghai Jiaotong University, Shanghai 200030, P.R.China

Received:1998-11-03 Revised:1999-10-25 Online:2000-03-18 Published:2000-03-18

摘要/Abstract

摘要： On the power unit vector presented by Yang Wenxiong, it for the mathematical theory of k multiplier is extended to create a new mathematical branch. The extended k multiplier is yet to concern the negative powers. Enumerating the combinatorial variaties and its functions can satisfy the various conditions, formulas, integrations, and equations etc. derived by Yang Wenxiong. The theory of k multiplier will be applied further to establish the theory of supperlight of a particle and its motion with the natural wave-particle duality etc.

关键词: power unit vector, k multiplier, hyperbolic function, hyperbolic equation

Abstract: On the power unit vector presented by Yang Wenxiong, it for the mathematical theory of k multiplier is extended to create a new mathematical branch. The extended k multiplier is yet to concern the negative powers. Enumerating the combinatorial variaties and its functions can satisfy the various conditions, formulas, integrations, and equations etc. derived by Yang Wenxiong. The theory of k multiplier will be applied further to establish the theory of supperlight of a particle and its motion with the natural wave-particle duality etc.

Key words: power unit vector, k multiplier, hyperbolic function, hyperbolic equation

中图分类号:

杨文熊. MATHEMATICAL THEORY OF k MULTIPLIER[J]. Applied Mathematics and Mechanics (English Edition), 2000, 21(3): 347-354.

Yang Wenxiong . MATHEMATICAL THEORY OF k MULTIPLIER[J]. Applied Mathematics and Mechanics (English Edition), 2000, 21(3): 347-354.

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MATHEMATICAL THEORY OF k MULTIPLIER

MATHEMATICAL THEORY OF k MULTIPLIER

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