In this lesson, we will explore a surprising connection between the Riemann Hypothesis and the concept of a random walk.

Random walks, fundamental in probability theory, model stochastic processes where each step is determined randomly. They often represent real-world phenomena in areas like physics, finance, and biology.

At first glance, the connection between a number-theoretic conjecture and a probabilistic process might seem tenuous. However, there is a strict connection between the location of the zeros of the Riemann zeta function and the random behavior of the Liouville Function.

Dive into our lesson to understand how all these distant pieces fit together!