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In probability theory, the arcsine laws are a collection of results for one-dimensional random walks and Brownian motion (the Wiener process). The best known of these is attributed to Paul Lévy. All three laws relate path properties of the Wiener process to the arcsine distribution. A random variable X on [0,1] is arcsine-distributed if

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  • In probability theory, the arcsine laws are a collection of results for one-dimensional random walks and Brownian motion (the Wiener process). The best known of these is attributed to Paul Lévy. All three laws relate path properties of the Wiener process to the arcsine distribution. A random variable X on [0,1] is arcsine-distributed if (en)
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  • 991209225 (xsd:integer)
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  • Paul Lévy (en)
dbp:first
  • Paul (en)
  • B. A. (en)
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  • A/a013170 (en)
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  • Lévy (en)
  • Rogozin (en)
dbp:title
  • Arcsine law (en)
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  • 1939 (xsd:integer)
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  • In probability theory, the arcsine laws are a collection of results for one-dimensional random walks and Brownian motion (the Wiener process). The best known of these is attributed to Paul Lévy. All three laws relate path properties of the Wiener process to the arcsine distribution. A random variable X on [0,1] is arcsine-distributed if (en)
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  • Arcsine laws (Wiener process) (en)
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