摘要
为了证明著名的哥德巴赫猜想("1+1"),笔者对传统的"取整函数"及"取小数函数"进行了重新定义,其目的是让这两个函数适用于复数域,这样就可以利用复变函数的相关理论以及解方程的相关原理对哥猜("1+1")展开分析了,第二个亮点是笔者给这两个函数设计了专用符号,第三个亮点是借助Γ函数巧妙构造出了三个重要的函数和一个核心的方程。总之,历经了漫长时日的斟酌分析、艰深的探究和无数次的修补完善,最后才能够或才敢确信自己证明了这个百年难题——哥德巴赫猜想。
In order to prove the famous Goldbach conjecture("1+1"),the traditional "rounding function" and "decimal function" are redefined by the author,so that the two functions can be applied to the complex number domain.Then we can analyze the Goldbach conjecture by using the theory of complex functions and the related principles of solving equations.The second highlight is that the author has designed the special symbols for the two functions,and the third highlight is the ingenious construction of three important functions and a core equation with the aid of the gamma function.In short,after a long time of careful analysis,hard exploration and countless repairs and improvements,only at last can he be convinced that he has proved this centenary problem—the Goldbach conjecture.
出处
《科教文汇》
2018年第27期63-66,共4页
Journal of Science and Education
关键词
哥猜(“1+1”)
Γ函数
实取尾函数
复取尾函数
空心花括号
方程的根
Goldbach conjecture ("1+1")
gamma function
real number tail function
complex number tail function
hollowed curly braces
roots of equation
