Abstract
We show that a stochastic flow which is generated by a stochastic differential equation on $\mathbb{R}^d$ with bounded volatility has a random attractor provided that the drift component in the direction towards the origin is larger than a certain strictly positive constant $\beta$<em></em> outside a large ball. Using a similar approach, we provide a lower bound for the linear growth rate of the inner radius of the image of a large ball under a stochastic flow in case the drift component in the direction away from the origin is larger than a certain strictly positive constant $\beta$<em></em> outside a large ball. To prove the main result we use <em>chaining techniques</em> in order to control the growth of the diameter of subsets of the state space under the flow.
Citation
Georgi Dimitroff. Michael Scheutzow. "Attractors and Expansion for Brownian Flows." Electron. J. Probab. 16 1193 - 1213, 2011. https://doi.org/10.1214/EJP.v16-894
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