Hirofumi Osada
Published 2010-04-02, updated 2011-02-07Version 2
We solve infinite-dimensional stochastic differential equations (ISDEs) describing an infinite number of Brownian particles interacting via two-dimensional Coulomb potentials. The equilibrium states of the associated unlabeled stochastic dynamics are the Ginibre random point field and Dyson's measures, which appear in random matrix theory. To solve the ISDEs we establish an integration by parts formula for these measures. Because the long-range effect of two-dimensional Coulomb potentials is quite strong, the properties of Brownian particles interacting with two-dimensional Coulomb potentials are remarkably different from those of Brownian particles interacting with Ruelle's class interaction potentials. As an example, we prove that the interacting Brownian particles associated with the Ginibre random point field satisfy plural ISDEs.
Brownian particles with rank-dependent drifts: Out-of-equilibrium behavior
Infinite-dimensional Stochastic Differential Equations with Symmetry
Infinite-dimensional stochastic differential equations and tail $ σ$-fields II: the IFC condition
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