The Locally Most Powerful Invariant Test for Detecting a Rank-P Gaussian Signal in White Noise
Title | The Locally Most Powerful Invariant Test for Detecting a Rank-P Gaussian Signal in White Noise |
Publication Type | Conference Paper |
Year of Publication | 2012 |
Authors | Ramírez, D., J. Iscar, J. Vía, I. Santamaría, and L. L. Scharf |
Conference Name | 7th IEEE Sensor Array and Multichannel Signal Processing Workshop |
Month Published | June |
Conference Location | Hoboken, NJ, USA |
Abstract | Spectrum sensing has become one of the main components of a cognitive transmitter. Conventional detectors suffer from noise power uncertainties and multiantenna detectors have been proposed to overcome this difficulty, and to improve the detection performance. However, most of the proposed multiantenna detectors are based on non-optimal techniques, such as the generalized likelihood ratio test (GLRT), or even heuristic approaches that are not based on first principles. In this work, we derive the locally most powerful invariant test (LMPIT), that is, the optimal invariant detector for close hypotheses, or equivalently, for a low signal-to-noise ratio (SNR). The traditional approach, based on the distributions of the maximal invariant statistic, is avoided thanks to Wijsman's theorem, which does not need these distributions. Our findings show that, in the low SNR regime, and in contrast to the GLRT, the additional spatial structure imposed by the signal model is irrelevant for optimal detection. Finally, we use Monte Carlo simulations to illustrate the good performance of the LMPIT. |
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