On the Geometrical Structure of Natural Numbers

Ramon Carbó Dorca
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Abstract

This work studies the natural powers of prime numbers as the building blocks of a Euclidian vector semi space. Some vectors generate the composite natural numbers by defining an appropriate geometrical norm. One also studies the structure of extended Mersenne numbers within this geometric point of view. Further geometric applications and extensions of the powers of natural numbers are also studied with the help of inward vector operations. Two research lines follow the first discussion on the geometrical aspects of natural numbers: the extension of the Fermat theorem and the Euler-Riemann function.
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论自然数的几何结构
这项工作研究了素数的自然幂作为欧几里得向量半空间的构建块。有些向量通过定义适当的几何范数来生成复合自然数。在这种几何观点下,我们还研究了扩展梅森数的结构。在向内向量运算的帮助下,进一步研究了自然数幂的几何应用和扩展。在第一次讨论自然数的几何方面之后,有两条研究路线:费马定理的推广和欧拉-黎曼函数。
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