Asymptotic laws for compositions derived from transformed subordinators
Abstract
A random composition of n appears when the points of a random closed set R⊂[0,1] are used to separate into blocks n points sampled from the uniform distribution. We study the number of parts Kn of this composition and other related functionals under the assumption that R=φ(S), where (St,t≥0) is a subordinator and φ:[0,∞][0,1] is a diffeomorphism. We derive the asymptotics of Kn when the L\'evy measure of the subordinator is regularly varying at 0 with positive index. Specializing to the case of exponential function φ(x)=1-e-x, we establish a connection between the asymptotics of Kn and the exponential functional of the subordinator.
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