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Weyl Prior and Bayesian Statistics Jiang, Ruichao; Tavakoli, Javad; Zhao, Yiqiang
Abstract
When using Bayesian inference, one needs to choose a prior distribution for parameters. The well-known Jeffreys prior is based on the Riemann metric tensor on a statistical manifold. Takeuchi and Amari defined the α-parallel prior, which generalized the Jeffreys prior by exploiting a higher-order geometric object, known as a Chentsov–Amari tensor. In this paper, we propose a new prior based on the Weyl structure on a statistical manifold. It turns out that our prior is a special case of the α-parallel prior with the parameter α equaling −n, where n is the dimension of the underlying statistical manifold and the minus sign is a result of conventions used in the definition of α-connections. This makes the choice for the parameter α more canonical. We calculated the Weyl prior for univariate Gaussian and multivariate Gaussian distribution. The Weyl prior of the univariate Gaussian turns out to be the uniform prior.
Item Metadata
| Title |
Weyl Prior and Bayesian Statistics
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| Creator | |
| Publisher |
Multidisciplinary Digital Publishing Institute
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| Date Issued |
2020-04-20
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| Description |
When using Bayesian inference, one needs to choose a prior distribution for parameters. The well-known Jeffreys prior is based on the Riemann metric tensor on a statistical manifold. Takeuchi and Amari defined the α-parallel prior, which generalized the Jeffreys prior by exploiting a higher-order geometric object, known as a Chentsov–Amari tensor. In this paper, we propose a new prior based on the Weyl structure on a statistical manifold. It turns out that our prior is a special case of the α-parallel prior with the parameter α equaling −n, where n is the dimension of the underlying statistical manifold and the minus sign is a result of conventions used in the definition of α-connections. This makes the choice for the parameter α more canonical. We calculated the Weyl prior for univariate Gaussian and multivariate Gaussian distribution. The Weyl prior of the univariate Gaussian turns out to be the uniform prior.
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| Subject | |
| Genre | |
| Type | |
| Language |
eng
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| Date Available |
2020-04-28
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| Provider |
Vancouver : University of British Columbia Library
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| Rights |
CC BY 4.0
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| DOI |
10.14288/1.0390016
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| URI | |
| Affiliation | |
| Citation |
Entropy 22 (4): 467 (2020)
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| Publisher DOI |
10.3390/e22040467
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| Peer Review Status |
Reviewed
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| Scholarly Level |
Faculty
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| Rights URI | |
| Aggregated Source Repository |
DSpace
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Rights
CC BY 4.0