Title :
On approximate renewal models for the superposition of renewal processes
Author :
Torab, Puyum ; Kamen, Edward
Author_Institution :
Movaz Networks, McLean, VA, USA
Abstract :
It is well known that the superposition of a finite number of renewal processes is not renewal anymore. A renewal approximation can be obtained by simply ignoring the interarrival dependencies and using the interarrival distribution. We show that this simple approximation is also rate-optimal, i.e., it defines a rate process that minimizes the mean-squared rate error functional over the set of all renewal processes. We also show that the optimal approximation is closely related to the rate of a new process, called the recurrence process, which is constructed by sampling the recurrence times from the original process. Applications to traffic analysis are discussed
Keywords :
least mean squares methods; sampling methods; telecommunication traffic; approximate renewal models; interarrival dependencies; interarrival distribution; mean-squared rate error functional minimization; optimal approximation; rate process; rate-optimal approximation; recurrence process; recurrence times; renewal processes superposition; sampling; traffic analysis; Computer networks; Distributed computing; Drives; Error analysis; Microscopy; Quantum computing; Queueing analysis; Reliability theory; Sampling methods; Traffic control;
Conference_Titel :
Communications, 2001. ICC 2001. IEEE International Conference on
Conference_Location :
Helsinki
Print_ISBN :
0-7803-7097-1
DOI :
10.1109/ICC.2001.936680
