Measure transformed quasi likelihood ratio test for Bayesian binary hypothesis testing

In this paper, a generalization of the Gaussian quasi likelihood ratio test (GQLRT) for Bayesian binary hypothesis testing is developed. The proposed generalization, called measure-transformed GQLRT (MT-GQLRT), selects a Gaussian probability model that best empirically fits a transformed conditional probability measure of the data. By judicious choice of the transform we show that, unlike the GQLRT, the proposed test is resilient to outliers and involves higher-order statistical moments leading to significant mitigation of the model mismatch effect on the decision performance. Under some mild regularity conditions we show that the test statistic of the proposed MT-GQLRT is asymptotically normal. A data driven procedure for optimal selection of the measure transformation parameters is developed that minimizes an empirical estimate of the asymptotic Bayes risk. The MT-GQLRT is applied to signal classification in a simulation example that establishes significantly improved probability of error performance relative to the standard GQLRT.

[1]  H. Vincent Poor,et al.  Complex Elliptically Symmetric Distributions: Survey, New Results and Applications , 2012, IEEE Transactions on Signal Processing.

[2]  Alfred O. Hero,et al.  Robust Multiple Signal Classification via Probability Measure Transformation , 2015, IEEE Transactions on Signal Processing.

[3]  Don H. Johnson,et al.  Statistical Signal Processing , 2009, Encyclopedia of Biometrics.

[4]  Wonyong Sung,et al.  A statistical model-based voice activity detection , 1999, IEEE Signal Processing Letters.

[5]  K. Athreya,et al.  Measure Theory and Probability Theory , 2006 .

[6]  Kellen Petersen August Real Analysis , 2009 .

[7]  Richard O. Duda,et al.  Pattern classification and scene analysis , 1974, A Wiley-Interscience publication.

[8]  Fernando Jaimes-Romero,et al.  Generalized Bayesian hypothesis testing for cell coverage determination , 2000, IEEE Trans. Veh. Technol..

[9]  Alfred O. Hero,et al.  Measure-transformed quasi likelihood ratio test , 2016, 2016 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[10]  John Law,et al.  Robust Statistics—The Approach Based on Influence Functions , 1986 .

[11]  Javier Ramírez,et al.  Statistical voice activity detection using a multiple observation likelihood ratio test , 2005, IEEE Signal Processing Letters.

[12]  R. A. Leibler,et al.  On Information and Sufficiency , 1951 .

[13]  Inderjit S. Dhillon,et al.  Matrix Nearness Problems with Bregman Divergences , 2007, SIAM J. Matrix Anal. Appl..

[14]  L. Scharf,et al.  Statistical Signal Processing of Complex-Valued Data: The Theory of Improper and Noncircular Signals , 2010 .