Litcius/Paper detail

Sharp Moment-Entropy Inequalities and Capacity Bounds for Symmetric Log-Concave Distributions

Mokshay Madiman, Piotr Nayar, Tomasz Tkocz

2020IEEE Transactions on Information Theory14 citationsDOIOpen Access PDF

Abstract

We show that the uniform distribution minimizes entropy among all one-dimensional symmetric log-concave distributions with fixed variance, as well as various generalizations of this fact to Rényi entropies of orders less than 1 and with moment constraints involving p-th absolute moments with p ≤ 2. As consequences, we give new capacity bounds for additive noise channels with symmetric log-concave noises, as well as for timing channels involving positive signal and noise where the noise has a decreasing log-concave density. In particular, we show that the capacity of an additive noise channel with symmetric, log-concave noise under an average power constraint is at most 0.254 bits per channel use greater than the capacity of an additive Gaussian noise channel with the same noise power. Consequences for reverse entropy power inequalities and connections to the slicing problem in convex geometry are also discussed.

Topics & Concepts

MathematicsGaussian noiseChannel capacityNoise (video)Entropy (arrow of time)Noise measurementChannel (broadcasting)Entropy power inequalityNoise powerApplied mathematicsGaussianBinary erasure channelAdditive white Gaussian noiseUpper and lower boundsDifferential entropyRegular polygonCombinatoricsProbability distributionMathematical analysisConvex functionNoise spectral densityAbsolute continuityValue noiseDiscrete mathematicsMaximum entropy probability distributionMoment (physics)Distribution (mathematics)Information theoryGradient noiseNoise temperatureTopology (electrical circuits)Signal-to-noise ratio (imaging)Wireless Communication Security TechniquesComplexity and Algorithms in GraphsMarkov Chains and Monte Carlo Methods