Recurrence and transience of excited random walks on and strips.
Zerner, Martin P.W. (2006)
Electronic Communications in Probability [electronic only]
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Displaying similar documents to “Hydrodynamic limit of zero range processes among random conductances on the supercritical percolation cluster.”
Recurrence and transience of excited random walks on and strips.
A note on the diffusive scaling limit for a class of linear systems.
Nagahata, Yukio, Yoshida, Nobuo (2010)
Electronic Communications in Probability [electronic only]
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Strong hydrodynamic limit for attractive particle systems on .
Bahadoran, Christophe, Guiol, Hervé, Ravishankar, Krishnamurthi, Saada, Ellen (2010)
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Convergence results and sharp estimates for the voter model interfaces.
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Electronic Journal of Probability [electronic only]
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Renormalization analysis of catalytic Wright-Fisher diffusions.
Fleischmann, Klaus, Swart, Jan M. (2006)
Electronic Journal of Probability [electronic only]
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Sharp asymptotic behavior for wetting models in -dimension.
Caravenna, Francesco, Giacomin, Giambattista, Zambotti, Lorenzo (2006)
Electronic Journal of Probability [electronic only]
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Sturm, Anja (2003)
Electronic Journal of Probability [electronic only]
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Examples of condition for diffusions in a random environment.
Schmitz, Tom (2006)
Electronic Journal of Probability [electronic only]
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Recurrence and transience for long-range reversible random walks on a random point process.
Caputo, Pietro, Faggionato, Alessandra, Gaudilliere, Alexandre (2009)
Electronic Journal of Probability [electronic only]
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Fragmentation of ordered partitions and intervals.
Basdevant, Anne-Laure (2006)
Electronic Journal of Probability [electronic only]
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On exponential convergence to a stationary measure for a class of random dynamical systems
Sergei B. Kuksin (2001)
Journées équations aux dérivées partielles
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For a class of random dynamical systems which describe dissipative nonlinear PDEs perturbed by a bounded random kick-force, I propose a “direct proof” of the uniqueness of the stationary measure and exponential convergence of solutions to this measure, by showing that the transfer-operator, acting in the space of probability measures given the Kantorovich metric, defines a contraction of this space.
The spatial -coalescent.
Limic, Vlada, Sturm, Anja (2006)
Electronic Journal of Probability [electronic only]
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