Levy's distributional property for symmetric Levy processes
classification
🧮 math.PR
keywords
levysymmetricdistributionalprocessespropertybackslashbrownianclassical
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We present the Levy's distributional property for symmetric Levy processes with generating triplet $(0, 0,\nu)$ or $(\sigma>0, \gamma, \nu)$ where $\nu$ is a symmetric measure on $R\backslash\{0\}$. This generalizes the classical Levy's theorem about Brownian motions with drift.
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