Lower estimates on microstates free entropy dimension

Abstract

By proving that certain free stochastic differential equations have stationary solutions, we give a lower estimate on the microstates free entropy dimension of certain n-tuples X1,...,Xn: we show that Abstract. By proving that certain free stochastic differential equations with analytic coefficients have stationary solutions, we give a lower estimate on the microstates free entropy dimension of certain n-tuples X1,...,Xn. In particular, we show that δ0(X1,...,Xn)≥MMoV where M=W*(X1,...,Xn) and V=\(∂(X1),...,∂(Xn)):∂∈C\ is the set of values of derivations A=C[X1,... Xn] A A with the property that ∂*∂(A)⊂ A. We show that for q sufficiently small (depending on n) and X1,...,Xn a q-semicircular family, δ0(X1,...,Xn)>1. In particular, for small q, q-deformed free group factors have no Cartan subalgebras. An essential tool in our analysis is a free analog of an inequality between Wasserstein distance and Fisher information introduced by Otto and Villani (and also studied in the free case by Biane and Voiculescu).