| Summary: | The past decade has seen a rapid application of information theoretic learning (ITL) criteria in robust signal processing and machine learning problems. Generally, in ITL's literature, it is seen that, under non-Gaussian assumptions, especially when the data are corrupted by heavy-tailed or multi-modal non-Gaussian distributions, information theoretic criteria [such as minimum error entropy (MEE)] outperform second order statistical ones. The objective of this research is to investigate this better performance of MEE criterion against that of minimum mean square error. Having found similar results for MEEand MSE-based methods, in the non-Gaussian environment under particular conditions, we need a precise demarcation between this occasional similarity and occasional outperformance. Based on the theoretic findings, we reveal a better touchstone for the outperformance of MEE versus MSE.
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