Random Matrices, Intrinsic Freeness, and Sharp Non-Asymptotic Inequalities
By: Afonso S. Bandeira
Potential Business Impact:
Makes math tools better for understanding data.
Random matrix theory has played a major role in several areas of pure and applied mathematics, as well as statistics, physics, and computer science. This lecture aims to describe the intrinsic freeness phenomenon and how it provides new easy-to-use sharp non-asymptotic bounds on the spectrum of general random matrices. We will also present a couple of illustrative applications in high dimensional statistical inference. This article accompanies a lecture that will be given by the author at the International Congress of Mathematicians in Philadelphia in the Summer of 2026.
Similar Papers
Sharp mean-field analysis of permutation mixtures and permutation-invariant decisions
Statistics Theory
Makes computer guesses more accurate with mixed data.
CLT for LES of real valued random centrosymmetric matrices
Probability
Finds math patterns in complex data.
Spectral analysis of high-dimensional spot volatility matrix with applications
Statistics Theory
Helps understand risky money changes from fast data.