Semi-symmetric statistical manifolds

Authors

  • Ferdinand Ngakeu Department of Mathematics and Computer Science, Faculty of Science, University of Douala
  • Nicanor Takam Fotsing Department of Mathematics and Computer Science, Faculty of Science, University of Douala https://orcid.org/0009-0006-2450-0554
  • Hans Fotsing Tetsing Department of Mathematics, Faculty of Science, University of Douala

Keywords:

Semi-symmetric connection, semi-Weyl structure, dual connection, semi-symmetric statistical manifold, 3S-manifold

Abstract

This paper studies semi-symmetric statistical manifolds (3S-manifolds for short) to generalise semi-Weyl manifolds. We prove that this class of manifolds is invariant under the conformal change of metrics.  We show that every 3S-structure $(g, \omega, \omega^{\ast}, \nabla)$ on a Riemannian manifold $(M,g)$ induces a statistical structure $(g, \widetilde{\nabla})$  on $M$ and  we find  necessary and  sufficient  conditions for $\nabla$ and $\widetilde{\nabla}$ to have the same sectional  curvature. In addition, the analogue of the statistical Curvature is defined for 3S structures and its properties are investigated. We also give a method to construct 3S structures on a warped product manifold from 3S structures on the fiber and base manifolds.

Vol. 8(2) (2025): International Journal of Maps in Mathematics

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Published

2025-09-28

How to Cite

Ngakeu, F., Takam Fotsing, N., & Fotsing Tetsing, H. (2025). Semi-symmetric statistical manifolds. International Journal of Maps in Mathematics, 8(2), 589–621. Retrieved from https://simadp.com/journalmim/article/view/329

Issue

Vol. 8 No. 2 (2025): International Journal of Maps in Mathematics

Section

Articles

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