Title :
High variability versus long-range dependence for network performance
Author :
Konstantopoulos, Takis ; Lin, Si-jian
Author_Institution :
Dept. of Electr. & Comput. Eng., Texas Univ., Austin, TX, USA
Abstract :
We investigate a stochastic model for high-speed network traffic, apparently exhibiting “long-range dependence”. Indeed, by defining long range dependence as a second-order property, we show that the model looks like a fractional Brownian motion, when time and space are scaled appropriately. However, when distributional limits are taken, for an appropriately normalized version of the model, long-range dependence vanishes in the limit, being replaced by “high variability”. We quantify the limit precisely and show that it is a Levy motion with stationary independent increments and marginals having a stable distribution which matches well actual VBR Video traces. Using the Levy process in a queueing system we find that the probability of buffer overflow matches the one computed by using the pre-limit model
Keywords :
Brownian motion; buffer storage; probability; queueing theory; telecommunication networks; telecommunication traffic; visual communication; Levy motion; Levy process; VBR video traces; buffer overflow probability; distributional limits; fractional Brownian motion; high speed network traffic; high variability; long-range dependence; marginals; network performance; prelimit model; queueing system; second-order property; stable distribution; stationary independent increments; stochastic model; Autocorrelation; Brownian motion; Buffer overflow; Computer networks; High-speed networks; Queueing analysis; Stochastic processes; Telecommunication traffic; Testing; Traffic control;
Conference_Titel :
Decision and Control, 1996., Proceedings of the 35th IEEE Conference on
Conference_Location :
Kobe
Print_ISBN :
0-7803-3590-2
DOI :
10.1109/CDC.1996.572695
