Tight Lower Bounds for $α$-Divergences Under Moment Constraints and Relations Between Different $α$

Abstract: The $\alpha$-divergences include the well-known Kullback-Leibler divergence, Hellinger distance and $\chi^{2$-divergence.} In this paper, we derive differential and integral relations between the $\alpha$-divergences that are generalizations of the relation between the Kullback-Leibler divergence and the $\chi^{2$-divergence.} We also show tight lower bounds for the $\alpha$-divergences under given means and variances. In particular, we show a necessary and sufficient condition such that the binary divergences, which are divergences between probability measures on the same $2$-point set, always attain lower bounds. Kullback-Leibler divergence, Hellinger distance, and $\chi^{2$-divergence} satisfy this condition.