Positively and negatively excited random walks on integers, with branching processes.
Kosygina, Elena, Zerner, Martin P.W. (2008)
Electronic Journal of Probability [electronic only]
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Kosygina, Elena, Zerner, Martin P.W. (2008)
Electronic Journal of Probability [electronic only]
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Greven, A., Klenke, A., Wakolbinger, A. (1999)
Electronic Journal of Probability [electronic only]
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Sznitman, Alain-Sol (2009)
Electronic Journal of Probability [electronic only]
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Dawson, Donald A., Greven, Andreas (1996)
Electronic Journal of Probability [electronic only]
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Bérard, Jean, Ramirez, Alejandro (2007)
Electronic Communications in Probability [electronic only]
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Rassoul-Agha, Firas (2005)
Electronic Communications in Probability [electronic only]
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Jean-Dominique Deuschel, Holger Kösters (2008)
Annales de l'I.H.P. Probabilités et statistiques
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We derive a quenched invariance principle for random walks in random environments whose transition probabilities are defined in terms of weighted cycles of bounded length. To this end, we adapt the proof for random walks among random conductances by Sidoravicius and Sznitman ( (2004) 219–244) to the non-reversible setting.
Biskup, Marek, Prescott, Timothy M. (2007)
Electronic Journal of Probability [electronic only]
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Zerner, Martin P.W. (2002)
Electronic Communications in Probability [electronic only]
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König, Wolfgang, O'Connell, Neil, Roch, Sébastien (2002)
Electronic Journal of Probability [electronic only]
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Fleischmann, Klaus, Greven, Andreas (1996)
Electronic Journal of Probability [electronic only]
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Holmes, Mark P. (2009)
Electronic Communications in Probability [electronic only]
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