School of Mathematics Event

Non-equilibrium Dynamics and Random Matrices

Log-integrability of Rademacher Fourier series and applications to random analytic functions

We prove that the logarithm of Fourier series with random signs is integrable to any positive power. We use this result to prove the angular equidistribution of the zeros of entire functions with random signs (and more generally the almost sure convergence of certain linear statistics of the zeros).

Date & Time

February 11, 2014 | 2:00pm – 3:00pm

Location

S-101

Speakers

Alon Nishry, Institute for Advanced Study

Affiliation

Member, School of Mathematics

Event Series

Special year seminar - Math

Categories

Mathematics
Academic

Video

Log-integrability of Rademacher Fourier series and applications to random analytic functions
Special Year 2013-14: Non-equilibrium Dynamics and Random Matrices
Special Year 2013-14: Non-equilibrium Dynamics and Random Matrices - Seminar