Diffusion arrêtée au premier instant où l'amplitude atteint un niveau donné
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The amplitude of a real process X, is the increasing process A defined as the difference between its maximum process and its minimum process. We study the Brownian case, and we characterize, in particular, the law of the first time when A reaches a fixed level a ≷0. We apply this basic study to the case when X is a continuous diffusion and also when X is the angular part of a planar Brownian motion
[1] W. Feller. The Asymptotic Distribution of the Range of Sums of Independent Random Variables , 1951 .
[2] Level Crossings of a Cauchy Process , 1986 .
[3] J. Pitman,et al. Asymptotic Laws of Planar Brownian Motion , 1986 .
[4] William Feller,et al. An Introduction to Probability Theory and Its Applications , 1967 .
[5] J. -. Gall,et al. Points cônes du mouvement brownien plan, le cas critique , 1992 .