Abstract
The paper generalizes and extends the notions of dual connections and of statistical manifold, with and without torsion. Links with the deformation algebras and with the Riemannian Rinehart algebras are established. The semi-Riemannian manifolds admitting flat dual connections with torsion are characterized, thus solving a problem suggested in 2000 by S. Amari and H. Nagaoka. New examples of statistical manifolds are constructed, within and beyond the classical setting. The invariant statistical structures on Lie groups are characterized and the dimension of their set is determined. Examples for the new defined geometrical objects are found in the theory of Information Geometry.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference18 articles.
1. Differential-Geometrical Methods in Statistics;Amari,1985
2. Overview and perspectives on metric-affine gravity
3. Information Geometry and Its Applications;Amari,2016
4. Information Geometry;Ay,2017
5. Geometric Modeling in Probability and Statistics;Calin,2014
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