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This œuvre, Invariant geometric structures on statistical models, by Hong van Le is licensed under a Creative Commons Attribution-ShareAlike 4.0 International license.

Invariant geometric structures on statistical models


Invariant geometric structures on statistical models
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We review the notion of parametrized measure models and tensor fields on them, which encompasses all statistical models considered by Chentsov [6], Amari [3] and Pistone-Sempi [10]. We give a complete description of n-tensor fields that are invariant under sufficient statistics. In the cases n = 2 and n = 3, the only such tensors are the Fisher metric and the Amari-Chentsov tensor. While this has been shown by Chentsov [7] and Campbell [5] in the case of finite measure spaces, our approach allows to generalize these results to the cases of infinite sample spaces and arbitrary n. Furthermore, we give a generalisation of the monotonicity theorem and discuss its consequences.
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Invariant geometric structures on statistical models
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