Relative α-Entropy Minimizers Subject to Linear Statistical Constraints

Abstract

We study minimization of a parametric family of relative entropies, termed relative α-entropies (denoted Iα(P,Q)). These arise as redundancies under mismatched compression when cumulants of compressed lengths are considered instead of expected compressed lengths. These parametric relative entropies are a generalization of the usual relative entropy (Kullback-Leibler divergence). Just like relative entropy, these relative α-entropies behave like squared Euclidean distance and satisfy the Pythagorean property. Minimization of Iα(P,Q) over the first argument on a set of probability distributions that constitutes a linear family is studied. Such a minimization generalizes the maximum R\'enyi or Tsallis entropy principle. The minimizing probability distribution (termed Iα-projection) for a linear family is shown to have a power-law.