# A Few Words About Author

The Riemann Hypothesis (RH) is true! 🙂

In a nutshell, RH (Re($z$) = Re($\overline{z}$) = $\frac{1}{2}$) is true if and only if the divergent Harmonic Series ($\sum_{k=1}^{ \infty } \frac{1}{k} = \infty$) exists.

Remark: Accepting the truth of the Riemann Hypothesis (RH), the complex nontrivial zeros (conjugate pairs) of the Riemann Zeta Function are $z = \frac{1}{2} + bi$ and $\overline{z} = \frac{1}{2} - bi$.

We hope you realize the truth and the importance of the Riemann Hypothesis. Good Luck! 👍

## My name is David Cole.

I am a former independent science researcher at researchgate.net, https://www.researchgate.net/profile/David-Cole-3. (Beware that some of my findings/works on that site are flawed, and they have been updated elsewhere.)

My interests include number theory, mathematical analysis, electrical engineering, and physics.

Yes! Cole, Montgomery, Lagarias, Odlyzko, Selberg, Erdős, Hardy, Hadamard, de la Vallee-Poussin, Riemann, Gauss, Euler, Euclid, and other mathematicians proved the Riemann Hypothesis! 👍✌

“Mathematicians stand on each other’s shoulders.” — Gauss.

”L’homme c’est rien—l’oeuvre c’est tout.”

The Riemann Hypothesis, Explained;

The Riemann Hypothesis: A Resource for the Afficionado and Virtuoso Alike;

Why is RH optimum?

Why is the Riemann Hypothesis (RH) true?

Zeta functions in algebraic geometry;

Topics on Algebra;

Please pray and every day. And I hope you have the greatest faith in Lord GOD because life (existence) is uncertain.

“Out of the fire, we came to be, and into the fire, we cease to be.”

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## 6 thoughts on “A Few Words About Author”

1. Hello, I enjoy reading through your post. I like to write a little comment to support you.

Liked by 1 person

2. Me gustaría agradecerles los esfuerzos que han realizado para escribir este sitio. Espero ver las mismas publicaciones de blog de alto grado suyas más adelante también. De hecho, sus habilidades de escritura creativa me han motivado a tener mi propio sitio ahora 😉

“I would like to thank you for the efforts you have put into writing this site. I hope to see the same high-grade blog posts from you later too. In fact, your creative writing skills have motivated me to have my own site now.” 😉

Liked by 1 person

1. Mi amigo o mi amiga 😉,

¡Muchas gracias y mucha suerte con tu web! 👍✌

Los mejores deseos,

Dave.

Like

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