Geometrical objects associated to a substructure

Fatma Özdemir*, Mircea Crĝşmǧreanu

*Corresponding author for this work

Research output: Contribution to journalArticlepeer-review

9 Citations (Scopus)

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.

Original languageEnglish
Pages (from-to)717-728
Number of pages12
JournalTurkish Journal of Mathematics
Volume35
Issue number4
DOIs
Publication statusPublished - 2011

Keywords

  • (anti)Hermitian metric
  • Induced polynomial structure
  • Polynomial substructure
  • Schouten and vrǧnceanu connections
  • Shape operator

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