Infinite-dimensional diffusion processes as gibbs measures onC[0,1]^{Z^d } |
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| Authors: | J D Deuschel |
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| Institution: | (1) Mathematikdepartement, ETH, CH-8092 Zürich, Switzerland |
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| Abstract: | Summary An infinite lattice system of interacting diffusion processes is characterized as a Gibbs distribution on
![$$C0,1]^{Z^d }$$](/content/n2271qh5p77764n8/440_2004_Article_BF01297489_TeX2GIFIE2.gif)
with continuous local conditional probabilities. Using estimates for the Vasserstein metric onC0, 1], Dobrushin's contraction technique is applied in order to obtain information about macroscopic properties of the entire diffusion process. |
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