A mutual information criterion with applications to canonical correlation analysis and graphical models
Timothy DelSole, Michael K. Tippett
Abstract
This paper derives a criterion for deciding conditional independence that is consistent with small-sample corrections of Akaike's information criterion but is easier to apply to such problems as selecting variables in canonical correlation analysis and selecting graphical models. The criterion reduces to mutual information when the assumed distribution equals the true distribution; hence, it is called mutual information criterion (MIC). Although small-sample Kullback-Leibler criteria for these selection problems have been proposed previously, some of which are not widely known, MIC is strikingly more direct to derive and apply.
Topics & Concepts
Akaike information criterionMutual informationBayesian information criterionCanonical correlationMathematicsConditional independenceIndependence (probability theory)Information CriteriaTotal correlationStatisticsMinimum description lengthSelection (genetic algorithm)CorrelationModel selectionConditional mutual informationComputer scienceArtificial intelligenceAlgorithmGeometryAdvanced Statistical Methods and ModelsSensory Analysis and Statistical MethodsStatistical Methods and Bayesian Inference