A fully new path to prove Riemann Hypothesis

TL;DR

This paper introduces a novel algebraic approach to the Riemann Hypothesis by transforming the Zeta function into a real function, potentially simplifying its proof and impacting cryptography and blockchain.

Contribution

It presents a new algebraic framework replacing complex analysis, offering a clear, concise, and computable proof path for the Riemann Hypothesis.

Findings

Positive feedback from Sir Atiyah

Revealed the essence of the Zeta function

Potential applications in cryptography and blockchain

Abstract

By transforming the Zeta function into a real function through Laplace inverse transformation, an algebraic research paradigm for prime number distribution was established, and important results were obtained (page 10). This method has received positive feedback from Sir Atiyah (see page 14 for details) and demonstrates significant potential for applications in the field of cryptography and blockchain. Core breakthrough: Revealing the essence of Zeta function, replacing complex analysis with convolutional algebra, making the proof path of Riemann hypothesis clear, concise, and computable.