On generalized arcsine laws and residual allocation models
Abstract
Based on their earlier studies of the arcsine law, Pitman and Yor in PY97 constructed a widely adopted PD(α, θ) family of random mass-partitions with parameters α ∈ [0,1),\ θ+α>0. We propose an alternative model based on generalized perpetuities, which extends the PD family in a continuous manner, incorporating any α≥ 0. This perspective yields a new, concise proof for the stick-breaking (or residual allocation) representations of PD distributions, recovering the classical results of McCloskey and Perman in particular. We apply this framework to provide a constructive and intuitive proof of Pitman and Yor's generalized arcsine law concerning the partitions arising from α-stable subordinators for α ∈ (0,1). The result shows that the random partitions generated by stable subordinators have identical distributions when observed over temporal or spatial intervals. This theorem has a number of significant implications for excursion theory. As a corollary, using purely probabilistic arguments, we obtain general arcsine laws for excursions of d-dimensional Bessel process for 0<d<2, and Brownian motion in particular.
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