Cross Mutual Information

Abstract

Mutual information (MI) is a useful information-theoretic measure to quantify the statistical dependence between two random variables: X and Y. Often, we are interested in understanding how the dependence between X and Y in one set of samples compares to another. Although the dependence between X and Y in each set of samples can be measured separately using MI, these estimates cannot be compared directly if they are based on samples from a non-stationary distribution. Here, we propose an alternative measure for characterising how the dependence between X and Y as defined by one set of samples is expressed in another, cross mutual information. We present a comprehensive set of simulation studies sampling data with X-Y dependencies to explore this measure. Finally, we discuss how this relates to measures of model fit in linear regression, and some future applications in neuroimaging data analysis.