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Variability as a better characterization of Shannon entropy

Gabriele Carcassi, Christine A Aidala, Julian Barbour

2021European Journal of Physics23 citationsDOIOpen Access PDF

Abstract

Abstract The Shannon entropy, one of the cornerstones of information theory, is widely used in physics, particularly in statistical mechanics. Yet its characterization and connection to physics remain vague, leaving ample room for misconceptions and misunderstanding. We will show that the Shannon entropy can be fully understood as measuring the variability of the elements within a given distribution: it characterizes how much variation can be found within a collection of objects. We will see that it is the only indicator that is continuous and linear, that it quantifies the number of yes/no questions (i.e. bits) that are needed to identify an element within the distribution, and we will see how applying this concept to statistical mechanics in different ways leads to the Boltzmann, Gibbs and von Neumann entropies.

Topics & Concepts

Statistical physicsPhysicsEntropy (arrow of time)Statistical mechanicsRényi entropyVon Neumann architectureVon Neumann entropyInformation theoryConnection (principal bundle)Characterization (materials science)Joint entropyVariation (astronomy)Theoretical physicsStatistical analysisPrinciple of maximum entropyProbability and statisticsInformation diagramShannon's source coding theoremElement (criminal law)Relation (database)Maximum entropy thermodynamicsAdvanced Thermodynamics and Statistical MechanicsStatistical Mechanics and EntropyComplex Systems and Dynamics
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