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New Theories / Re: What makes Riemann's Hypothesis Hard to Prove?
« Last post by hamdani yusuf on 20/05/2024 22:27:34 »Due to the shape around the narrow transition strip between 1.996 pi i and 2.002117 pi i, this function can be called S function.
Let's give the names for the edges of transition strip of S function.
α is a positive number such that the curve S(x + (2-α) pi i ) crosses the edges of the critical strip at its turning points. Its value is around 0.004
β is a positive number such that the curve S(x + (2+β) pi i ) crosses the real line at its inflection point. Its value is around 0.002117
Let's give the names for the edges of transition strip of S function.
α is a positive number such that the curve S(x + (2-α) pi i ) crosses the edges of the critical strip at its turning points. Its value is around 0.004
β is a positive number such that the curve S(x + (2+β) pi i ) crosses the real line at its inflection point. Its value is around 0.002117