R\'enyi entropy and variance comparison for symmetric log-concave random variables

Abstract

We show that for any α>0 the R\'enyi entropy of order α is minimized, among all symmetric log-concave random variables with fixed variance, either for a uniform distribution or for a two sided exponential distribution. The first case occurs for α ∈ (0,α*] and the second case for α ∈ [α*,∞), where α* satisfies the equation 1α*-1 α*= 12 6, that is α* ≈ 1.241. Using those results, we prove that one-sided exponential distribution minimizes R\'enyi entropy of order α ≥ 2 among all log-concave random variables with fixed variance.