On the occupation measure of super-Brownian motion.
Le Gall, Jean-François, Merle, Mathieu (2006)
Electronic Communications in Probability [electronic only]
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Le Gall, Jean-François, Merle, Mathieu (2006)
Electronic Communications in Probability [electronic only]
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Caravenna, Francesco, Giacomin, Giambattista, Zambotti, Lorenzo (2006)
Electronic Journal of Probability [electronic only]
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Deblassie, Dante (2009)
Electronic Journal of Probability [electronic only]
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Pechtl, Andreas (1999)
Journal of Applied Mathematics and Decision Sciences
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Fleischmann, Klaus, Mörters, Peter, Wachtel, Vitali (2006)
Electronic Journal of Probability [electronic only]
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Feyel, Denis, de La Pradelle, Arnaud (2006)
Electronic Journal of Probability [electronic only]
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M. Ait Ouahra (2004)
Annales mathématiques Blaise Pascal
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We give some limit theorems for the occupation times of 1-dimensional Brownian motion in some anisotropic Besov space. Our results generalize those obtained by Csaki et [] in continuous functions space.
Khoshnevisan, Davar, Salminen, Paavo, Yor, Marc (2006)
Electronic Communications in Probability [electronic only]
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Nane, Erkan (2006)
Electronic Journal of Probability [electronic only]
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Panki Kim, Renming Song, Zoran Vondraček (2012)
Annales de l’institut Fourier
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We study minimal thinness in the half-space for a large class of subordinate Brownian motions. We show that the same test for the minimal thinness of a subset of below the graph of a nonnegative Lipschitz function is valid for all processes in the considered class. In the classical case of Brownian motion this test was proved by Burdzy.