Pseudo-Sasakian Manifolds Endowed with A Contact Conformal Connection

Authors

Vladislav V. Goldberg, New Jersey Institute of Technology
Radu Rosca, New Jersey Institute of Technology

Document Type

Article

Publication Date

1-1-1986

Abstract

Pseudo-Sasakian manifolds [formula omitted] endowed with a contact conforinal connection are defined. It is proved that such manifolds are space forms M(K), K < 0, and some remarkable properties of the Lie algebra of infinitesimal transformations of the principal vector field U on M are discussed. Properties of the leaves of a co-isotropic foliation on M and properties of the tangent bundle manifold TM having M as a basis are studied. © 1986, Hindawi Publishing Corporation. All rights reserved.

Identifier

84958299801 (Scopus)

Publication Title

International Journal of Mathematics and Mathematical Sciences

External Full Text Location

https://doi.org/10.1155/S0161171286000881

e-ISSN

16870425

ISSN

01611712

First Page

733

Last Page

747

Issue

4

Volume

9

Recommended Citation

Goldberg, Vladislav V. and Rosca, Radu, "Pseudo-Sasakian Manifolds Endowed with A Contact Conformal Connection" (1986). Faculty Publications. 21057.
https://digitalcommons.njit.edu/fac_pubs/21057