A phase transition in the Bakry-\'Emery gradient estimate for Dyson Brownian motion

Abstract

In this paper, we find a gap between the lower bound of the Bakry-\'Emery N-Ricci tensor RicN and the Bakry-\'Emery gradient estimate BE in the space associated with the finite-particle Dyson Brownian motion (DBM) with inverse temperature 0<β<1. Namely, we prove that, for the weighted space ( Rn, wβ) with wβ=Πi<jn |xi-xj|β and any N∈[n+β2n(n-1),+∞], β 1 RicN 0 \ \& \ BE(0,N) hold; 0 < β < 1 RicN 0 holds while BE(0,N) does not, which shows a phase transition of the Dyson Brownian motion regarding the Bakry-\'Emery curvature bound in the small inverse temperature regime.