About: Maximum entropy probability distribution

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In statistics and information theory, a maximum entropy probability distribution has entropy that is at least as great as that of all other members of a specified class of probability distributions. According to the principle of maximum entropy, if nothing is known about a distribution except that it belongs to a certain class (usually defined in terms of specified properties or measures), then the distribution with the largest entropy should be chosen as the least-informative default. The motivation is twofold: first, maximizing entropy minimizes the amount of prior information built into the distribution; second, many physical systems tend to move towards maximal entropy configurations over time.

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dbo:abstract	In statistics and information theory, a maximum entropy probability distribution has entropy that is at least as great as that of all other members of a specified class of probability distributions. According to the principle of maximum entropy, if nothing is known about a distribution except that it belongs to a certain class (usually defined in terms of specified properties or measures), then the distribution with the largest entropy should be chosen as the least-informative default. The motivation is twofold: first, maximizing entropy minimizes the amount of prior information built into the distribution; second, many physical systems tend to move towards maximal entropy configurations over time. (en)
dbo:wikiPageExternalLink	https://ieeexplore.ieee.org/abstract/document/7849175 http://www.mtm.ufsc.br/~taneja/book/book.html http://www.mtm.ufsc.br/~taneja/book/node14.html https://archive.org/download/ElementsOfInformationTheory2ndEd/Wiley_-_2006_-_Elements_of_Information_Theory_2nd_Ed.pdf%7Cpublisher=Wiley%7Cisbn=978-0471241959
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rdfs:comment	In statistics and information theory, a maximum entropy probability distribution has entropy that is at least as great as that of all other members of a specified class of probability distributions. According to the principle of maximum entropy, if nothing is known about a distribution except that it belongs to a certain class (usually defined in terms of specified properties or measures), then the distribution with the largest entropy should be chosen as the least-informative default. The motivation is twofold: first, maximizing entropy minimizes the amount of prior information built into the distribution; second, many physical systems tend to move towards maximal entropy configurations over time. (en)
rdfs:label	Maximum entropy probability distribution (en)
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