K. K. Kataria, M. Dhillon
Published 2023-10-10Version 1
In this paper, we study the merging of independent generalized counting processes (GCPs). First, we study the merging of finite number of independent GCPs and then extend it to the countably infinite case. It is observed that the merged process is a GCP with increased arrival rates. Some distributional properties of the merged process are obtained. It is shown that a packet of jumps arrives in the merged process according to Poisson process. An application to industrial fishing problem is discussed.
Applications of the perturbation formula for Poisson processes to elementary and geometric probability
Superposition of time-changed Poisson processes and their hitting times
A Characterization of the Poisson Process revisited
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