Abstract
We study the superposition process of a class of independent renewal processes with longrange dependence. It is known that under two different scalings in time and space either fractional Brownian motion or a stable Lévy process may arise in the rescaling asymptotic limit. It is shown here that in a third, intermediate scaling regime a new limit process appears, which is neither Gaussian nor stable. The new limit process is characterized by its cumulant generating function and some of its properties are discussed.
Citation
Raimundas Gaigalas. Ingemar Kaj. "Convergence of scaled renewal processes and a packet arrival model." Bernoulli 9 (4) 671 - 703, August 2003. https://doi.org/10.3150/bj/1066223274
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