Curvature bound of Dyson Brownian Motion
Abstract
We construct a strongly local symmetric Dirichlet form on the configuration space whose symmetrising (thus also invariant) measure is sineβ, which is the law of the sine β ensemble for every β>0. For every β>0, this Dirichlet form satisfies the Bakry-\'Emery gradient estimate BE(K, ∞) with K=0. This implies various functional inequalities, including the local Poincar\'e inequality, the local log-Sobolev inequality and the local hyper-contractivity. We then introduce an L2-transportation-type extended distance d on , and prove the dimension-free Harnack inequality and several Lipschitz regularisation estimates of the L2-semigroup associated with the Dirichlet form in terms of d. As a result of BE(0,∞), we obtain that the dual semigroup on the space of probability measures over , endowed with a Benamou--Brenier-like extended distance W E, satisfies the evolutional variation inequality with respect to the Bolzmann--Shannon entropy Entsineβ associated with sineβ. Furthermore, the dual semigroup is characterised as the unique W E-gradient flow in the space of probability measures with respect to Entsineβ. Finally, we provide a sufficient condition for BE(K, ∞) beyond sineβ and apply it to the infinite particle diffusion whose symmetrising measure is the law of the 1-dimensional (β,s)-circular Riesz gas with β>0 and 0<s<1.
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