Publication: On subordinators, self-similar Markov processes and some factorizations of the exponential variable
On subordinators, self-similar Markov processes and some factorizations of the exponential variable
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Bertoin, J., & Yor, M. (2001). On subordinators, self-similar Markov processes and some factorizations of the exponential variable. Electronic Communications in Probability, 6, 95–106. https://doi.org/10.1214/ECP.v6-1039
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Abstract
Let ξ be a subordinator with Laplace exponent Φ, I=∫∞0exp(−ξs)ds the so-called exponential functional, and X (respectively, X^) the self-similar Markov process obtained from ξ (respectively, from ξ^=−ξ) by Lamperti's transformation. We establish the existence of a unique probability measure ρ on ]0,∞[ with k-th moment given for every k∈N by the product Φ(1)⋯Φ(k), and which bears some remarkable connections with the preceding variables. In particular we show that if R is an independent random variable with law ρ then IR is a standard e
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- Bertoin, Jean
- Yor, Marc
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Bertoin, J., & Yor, M. (2001). On subordinators, self-similar Markov processes and some factorizations of the exponential variable. Electronic Communications in Probability, 6, 95–106. https://doi.org/10.1214/ECP.v6-1039
