Tsallis and R\'enyi deformations linked via a new λ-duality

Abstract

Tsallis and R\'enyi entropies, which are monotone transformations of each other, are deformations of the celebrated Shannon entropy. Maximization of these deformed entropies, under suitable constraints, leads to the q-exponential family which has applications in non-extensive statistical physics, information theory and statistics. In previous information-geometric studies, the q-exponential family was analyzed using classical convex duality and Bregman divergence. In this paper, we show that a generalized λ-duality, where λ = 1 - q is the constant information-geometric curvature, leads to a generalized exponential family which is essentially equivalent to the q-exponential family and has deep connections with R\'enyi entropy and optimal transport. Using this generalized convex duality and its associated logarithmic divergence, we show that our λ-exponential family satisfies properties that parallel and generalize those of the exponential family. Under our framework, the R\'enyi entropy and divergence arise naturally, and we give a new proof of the Tsallis/R\'enyi entropy maximizing property of the q-exponential family. We also introduce a λ-mixture family which may be regarded as the dual of the λ-exponential family, and connect it with other mixture-type families. Finally, we discuss a duality between the λ-exponential family and the λ-logarithmic divergence, and study its statistical consequences.