枯树生花于“黎曼猜想之ζ零点分布”及探究

Proof of Riemann Hypothesis about Non-trivial Zeros of the Zeta Function also Let the Old Methods Produce New Vitality & Exploration

作者非常自信自己完美地证明了仅剩的最后一个黎曼猜想——ζ函数的零点分布假设。他的这种自信既来自于公理集合论中“任意无穷集合,它们的势都相等”的这个经典定理,也来自于黎曼ζ函数所含有的一个重要性质,更来自于他的“双定理论”,还来自于他坚信自己曾经绝妙地证明了大众化的百年难题——哥德巴赫猜想。

The author is very confident that he perfectly proved Riemann hypothesis of non-trivial zeros of ζ. His confidence comes from the classical theorem in axiomatic set theory—＂Any two different infinite sets always have the same cardinality＂, also from an important property of the Riemann zeta function, also from his ＂the theory of double fixed nature＂, and also from his firm belief that he had proved the problem that everyone under-stands but still has not been solved for hundreds of years, that is, the Goldbach＇s Conjecture.