Geometrical objects associated to a substructure

Authors

FATMA ÖZDEMİR
MIRCEA CRAŞMAREANU

DOI

10.3906/mat-0710-33

Abstract

Several geometric objects, namely global tensor fields of (1,1)-type, linear connections and Riemannian metrics, associated to a given substructure on a splitting of tangent bundle, are studied. From the point of view of lifting to entire manifold, two types of polynomial substructures are distinguished according to the vanishing of not of the sum of the coefficients. Conditions of parallelism for the extended structure with respect to some remarkable linear connections are given in two forms, firstly in a global description and secondly using the decomposition in distributions. A generalization of both Hermitian and anti-Hermitian geometry is proposed.

Keywords

Polynomial substructure, Induced polynomial structure, Schouten and Vr\u{a}nceanu connections, (anti)Hermitian metric, Shape operator

First Page

717

Last Page

728

Recommended Citation

ÖZDEMİR, FATMA and CRAŞMAREANU, MIRCEA (2011) "Geometrical objects associated to a substructure," Turkish Journal of Mathematics: Vol. 35: No. 4, Article 12. https://doi.org/10.3906/mat-0710-33
Available at: https://journals.tubitak.gov.tr/math/vol35/iss4/12