Phi-Entropic Measures of Correlation

Abstract

A measure of correlation is said to have the tensorization property if it is unchanged when computed for i.i.d.\ copies. More precisely, a measure of correlation between two random variables (X, Y) denoted by (X, Y), has the tensorization property if (Xn, Yn)=(X, Y) where (Xn, Yn) is n i.i.d.\ copies of (X, Y).Two well-known examples of such measures are the maximal correlation and the hypercontractivity ribbon (HC~ribbon). We show that the maximal correlation and HC ribbons are special cases of -ribbon, defined in this paper for any function from a class of convex functions (-ribbon reduces to HC~ribbon and the maximal correlation for special choices of ). Any -ribbon is shown to be a measures of correlation with the tensorization property. We show that the -ribbon also characterizes the -strong data processing inequality constant introduced by Raginsky. We further study the -ribbon for the choice of (t)=t2 and introduce an equivalent characterization of this ribbon.