A decades-long breakthrough in zero-density estimates and primes in short intervals
Abstract
The Riemann Hypothesis (RH) asserts that every nontrivial zero of the Riemann zeta-function has real part equal to 1/2. A zero-density theorem provides evidence towards RH by bounding the number of zeros of the zeta-function with real part greater than 1/2. In 2024, Larry Guth and James Maynard announced a new zero-density theorem which, for a key location in the critical strip, strengthens previous work of Ingham and is the first such improvement in over 80 years. This expository paper places this remarkable achievement in the context of the rich history of zero-density theorems and explores its implications on the distribution of primes in short intervals.
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