Large Values of Dirichlet Polynomials and the Zeta Function
Hausdorff Center for Mathematics via YouTube
Learn AI, Data Science & Business — Earn Certificates That Get You Hired
Learn Backend Development Part-Time, Online
Overview
Google, IBM & Meta Certificates – 40% Off
One plan covers every Professional Certificate on Coursera.
Unlock All Certificates
Explore a lecture by James Maynard that delves into the critical relationship between analytic number theory, prime numbers, and the zeta function through the lens of Dirichlet polynomials. This 53-minute presentation from the Hausdorff Center for Mathematics examines how many significant results in number theory can be reduced to questions about large values of Dirichlet polynomials, which often transform into pure harmonic analysis problems requiring minimal number-theoretic knowledge. Discover the fascinating pattern across different mathematical techniques and regimes where a single limiting scenario emerges—one where researchers frequently cannot improve beyond a "trivial bound." Learn about key questions in this mathematical domain and understand the critical limiting scenarios that appear in each case.
Syllabus
James Maynard: Large values of Dirichlet polynomials and the zeta function
Taught by
Hausdorff Center for Mathematics