Convergence of Brownian motions on RCD(K,infty) spaces
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🧮 math.PR
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convergencebrownianinftymotionsspacesconditionsdistributionsequivalent
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Suppose that metric measure spaces X_n=(X_n, d_n, m_n) satisfy RCD(K,infty) conditions with m_n(X_n)=1. Then the measured Gromov convergence (introduced by Gigili-Mondino-Savare '13) of X_n is equivalent to the weak convergence of the laws of Brownian motions on X_n with initial distributions m_n.
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