Periodicity-Based Anomalies in Self-Similar Network Traffic Flow Measurements

Network traffic flow measurement is fundamental in timely monitoring computer networks and in diagnosing potential anomalies. Previous measurement studies have shown that network traffic flows are often self-similar. The degree of self-similarity is described by the Hurst parameter H. In the literature, various methods have been used in estimating H, while their performances have not been evaluated for network traces that contain periodicity-based anomalies. In this paper, we investigate the performance of well-known estimators for traffic flow measurements with periodicity-based anomalies. We derive analytical expressions for widely used estimation methods in time, frequency, wavelet, and eigen domains and demonstrate through simulations that periodicity-based anomalies affect Hurst parameter estimation, causing unreliable H estimates. We show that our theoretical and experimental results are consistent with the observations of real network traffic flow measurements.

[1]  L. Oxley,et al.  Estimators for Long Range Dependence: An Empirical Study , 2009, 0901.0762.

[2]  Jianbo Gao,et al.  Principal component analysis of 1/fα noise , 2003 .

[3]  Süleyman Baykut,et al.  Estimation of Spectral Exponent Parameter of Process in Additive White Background Noise , 2007, EURASIP J. Adv. Signal Process..

[4]  Walter Willinger,et al.  On the self-similar nature of Ethernet traffic , 1993, SIGCOMM '93.

[5]  Murad S. Taqqu,et al.  Theory and applications of long-range dependence , 2003 .

[6]  Melike Erol-Kantarci,et al.  The influence of a single-tone sinusiod over hurst estimators , 2005, 2005 13th European Signal Processing Conference.

[7]  Melike Erol-Kantarci,et al.  On the Use of Principle Component Analysis for the Hurst Parameter Estimation of Long-Range Dependent Network Traffic , 2006, ISCIS.

[8]  Anja Feldmann,et al.  Dynamics of IP traffic: a study of the role of variability and the impact of control , 1999, SIGCOMM '99.

[9]  Houssain Kettani,et al.  A novel approach to the estimation of the long-range dependence parameter , 2006, IEEE Transactions on Circuits and Systems II: Express Briefs.

[10]  Yi Zhang,et al.  PCA Based Hurst Exponent Estimator for fBm Signals Under Disturbances , 2008, IEEE Transactions on Signal Processing.

[11]  Stephen M. Kogon,et al.  Signal modeling with self-similar α-stable processes: the fractional Levy stable motion model , 1996, IEEE Trans. Signal Process..

[12]  J. S. Marron,et al.  On the wavelet spectrum diagnostic for Hurst parameter estimation in the analysis of Internet traffic , 2005, Comput. Networks.

[13]  A. Oppenheim,et al.  Signal processing with fractals: a wavelet-based approach , 1996 .

[14]  Luigino Benetazzo,et al.  On the Analysis of Communication and Computer Networks by Traffic Flow Measurements , 2006, IEEE Transactions on Instrumentation and Measurement.

[15]  B. Mandelbrot,et al.  Fractional Brownian Motions, Fractional Noises and Applications , 1968 .

[16]  Michalis Faloutsos,et al.  On power-law relationships of the Internet topology , 1999, SIGCOMM '99.

[17]  Süleyman Baykut,et al.  Principal Component Analysis of the Fractional Brownian Motion for 0 < H < 0.5 , 2006, 2006 IEEE International Conference on Acoustics Speech and Signal Processing Proceedings.

[18]  Steven Kay,et al.  Modern Spectral Estimation: Theory and Application , 1988 .

[19]  T. Higuchi Approach to an irregular time series on the basis of the fractal theory , 1988 .

[20]  G. Wornell Wavelet-based representations for the 1/f family of fractal processes , 1993, Proc. IEEE.

[21]  Patrice Abry,et al.  Wavelet Analysis of Long-Range-Dependent Traffic , 1998, IEEE Trans. Inf. Theory.

[22]  M. Taqqu,et al.  Estimating long-range dependence in the presence of periodicity: An empirical study , 1999 .

[23]  Patrick Flandrin,et al.  Wavelet analysis and synthesis of fractional Brownian motion , 1992, IEEE Trans. Inf. Theory.

[24]  Michalis Faloutsos,et al.  Long-range dependence: now you see it, now you don't! , 2002, Global Telecommunications Conference, 2002. GLOBECOM '02. IEEE.

[25]  Matthew Roughan,et al.  Real-time estimation of the parameters of long-range dependence , 2000, TNET.

[26]  Claudio Narduzzi,et al.  A Study of Measurement-Based Traffic Models for Network Diagnostics , 2008, IEEE Transactions on Instrumentation and Measurement.