Measuring the Complexity of Continuous Distributions

Measuring the Complexity of Continuous Distributions

We extend previously proposed measures of complexity, emergence, and self-organization to continuous distributions using differential entropy. Given that the measures were based on Shannon's information, the novel continuous complexity measures describe how a system's predictability change...

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Veröffentlicht in:Entropy (Basel, Switzerland) Switzerland), 2016-03, Vol.18 (3), p.72-72
Hauptverfasser: Santamaría-Bonfil, Guillermo, Fernández, Nelson, Gershenson, Carlos
Format: Artikel
Sprache:eng
Schlagworte:
Adaptation
Complexity
Emergence
Entropy
Gaussian
Mathematical analysis
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Beschreibung
Zusammenfassung:We extend previously proposed measures of complexity, emergence, and self-organization to continuous distributions using differential entropy. Given that the measures were based on Shannon's information, the novel continuous complexity measures describe how a system's predictability changes in terms of the probability distribution parameters. This allows us to calculate the complexity of phenomena for which distributions are known. We find that a broad range of common parameters found in Gaussian and scale-free distributions present high complexity values. We also explore the relationship between our measure of complexity and information adaptation.
ISSN:1099-4300
1099-4300
DOI:10.3390/e18030072