A Comparative Study of Generators of Synthetic Self-Similar Teletraffic
H.-D. J. Jeong, D. McNickle and K. Pawlikowski
Department of Computer Science
University of Canterbury
Abstract
It is generally accepted that self-similar (or fractal) processes may provide better models for teletraffic in modern telecommunication networks than Poisson processes. If this is not taken into account, it can lead to inaccurate conclusions about performance of telecommunication networks. Thus, an important requirement for conducting simulation studies of telecommunication networks is the ability to generate long synthetic stochastic self-similar sequences.
Three generators of pseudo-random self-similar sequences, based on the FFT [19], RMD [12] and SRA method [5], [10], are compared and analysed in this paper. Properties of these generators were experimentally studied in the sense of their statistical accuracy and times required to produce sequences of a given (long) length. While all three generators show similar levels of accuracy of the output data (in the sense of relative accuracy of the Hurst parameter), the RMD- and SRA-based generators appear to be much faster than the generator based on FFT. Our results also show that a robust method for comparative studies of self-similarity in pseudo-random sequences is needed.