A Class of Subadditive Information Measures and their Applications

Abstract

We introduce a two-parameter family of discrepancy measures, termed (G,f)-divergences, obtained by applying a non-decreasing function G to an f-divergence Df. Building on Csisz\'ar's formulation of mutual f-information, we define a corresponding (G,f)-information measure IG,f(X;Y). A central theme of the paper is subadditivity over product distributions and product channels. We develop reduction principles showing that, for broad classes of G, it suffices to verify divergence subadditivity on binary alphabets. Specializing to the functions G(x)∈\x,(1+x),-(1-x)\, we derive tractable sufficient conditions on f that guarantee subadditivity, covering many standard f-divergences. Finally, we present applications to finite-blocklength converses for channel coding, bounds in binary hypothesis testing, and an extension of the Shannon--Gallager--Berlekamp sphere-packing exponent framework to subadditive (G,f)-divergences.