Title :
Robust Hypothesis Testing With a Relative Entropy Tolerance
Author :
Levy, Bernard C.
Author_Institution :
Dept. of Electr. & Comput. Eng, Univ. of California, Davis, CA
Abstract :
This paper considers the design of a minimax test for two hypotheses where the actual probability densities of the observations are located in neighborhoods obtained by placing a bound on the relative entropy between actual and nominal densities. The minimax problem admits a saddle point which is characterized. The robust test applies a nonlinear transformation which flattens the nominal likelihood ratio in the vicinity of one. Results are illustrated by considering the transmission of binary data in the presence of additive noise.
Keywords :
entropy; probability; signal detection; additive noise; binary data; minimax test; nominal likelihood ratio; nonlinear transformation; probability densities; relative entropy tolerance; robust hypothesis testing; signal detection; Additive noise; Context modeling; Degradation; Detectors; Entropy; Minimax techniques; Noise robustness; Pollution measurement; Signal detection; Testing; Kullback–Leibler divergence; least favorable densities; min-max problem; robust hypothesis testing; saddle point;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2008.2008128
