Small Sample Size Performance of the Energy Detector

We examine the small sample size performance of the energy detector for spectrum sensing in AWGN. By making use of the cube-of-Gaussian approximation of chi-squared random variables, we derive a novel, simple, and accurate analytical expression for the minimum number of samples required to achieve a desired probability of detection and false alarm. This way, the number of samples can be calculated by the energy detector with low complexity. We also propose a useful approximation for the performance of cooperative energy detection.

[1]  Douglas M. Hawkins,et al.  A Note on the Transformation of Chi-Squared Variables to Normality , 1986 .

[2]  Milton Abramowitz,et al.  Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables , 1964 .

[3]  Vladimir I. Kostylev,et al.  Energy detection of a signal with random amplitude , 2002, 2002 IEEE International Conference on Communications. Conference Proceedings. ICC 2002 (Cat. No.02CH37333).

[4]  Erik G. Larsson,et al.  Spectrum Sensing for Cognitive Radio : State-of-the-Art and Recent Advances , 2012, IEEE Signal Processing Magazine.

[5]  Luca Rugini,et al.  Three-stage centralized spectrum sensing of OFDM signals , 2011, 2011 IEEE 12th International Workshop on Signal Processing Advances in Wireless Communications.

[6]  Mohamed-Slim Alouini,et al.  On the Energy Detection of Unknown Signals Over Fading Channels , 2007, IEEE Transactions on Communications.

[7]  J. I. Mararm,et al.  Energy Detection of Unknown Deterministic Signals , 2022 .

[8]  E. B. Wilson,et al.  The Distribution of Chi-Square. , 1931, Proceedings of the National Academy of Sciences of the United States of America.

[9]  Murat Torlak,et al.  A Comparison of Energy Detectability Models for Spectrum Sensing , 2008, IEEE GLOBECOM 2008 - 2008 IEEE Global Telecommunications Conference.

[10]  K. B. Letaief,et al.  Optimization of cooperative spectrum sensing with energy detection in cognitive radio networks , 2009, IEEE Transactions on Wireless Communications.

[11]  S. Kay Fundamentals of statistical signal processing: estimation theory , 1993 .

[12]  S. H. Abdel-Aty,et al.  Approximate formulae for the percentage points and the probability integral of the non-central χ2 distribution , 1954 .