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Liberation of Projections

Published 26 Nov 2012 in math.FA, math.AP, math.CV, math.OA, and math.PR | (1211.6037v3)

Abstract: We study the liberation process for projections: $(p,q)\mapsto (p_t,q)= (u_tpu_t\ast,q)$ where $u_t$ is a free unitary Brownian motion freely independent from ${p,q}$. Its action on the operator-valued angle $qp_tq$ between the projections induces a flow on the corresponding spectral measures $\mu_t$; we prove that the Cauchy transform of the measure satisfies a holomorphic PDE. We develop a theory of subordination for the boundary values of this PDE, and use it to show that the spectral measure $\mu_t$ possesses a piecewise analytic density for any $t>0$ and any initial projections of trace $\frac12$. We us this to prove the Unification Conjecture for free entropy and information in this trace $\frac12$ setting.

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