Certain Study on Lorentzian-Para Sasakian Manifolds

R. T. Naveen Kumar; P. Somashekhara; B. Phalaksha Murthy; Siva Kota Reddy Polaepalli

doi:10.5269/bspm.81298

R. T. Naveen Kumar Siddaganga Institute of Technology, Tumkur, India
P. Somashekhara Govt First Grade College, Chikkamagaluru, Karnataka, INDIA.
B. Phalaksha Murthy Department of Mathematics, Govt First Grade College, Kadur-577 548, Karnataka, INDIA.
Siva Kota Reddy Polaepalli JSS Science and Technology University http://orcid.org/0000-0003-4033-8148

Abstract

The present paper deals with certain study of Lorentzian para-Sasakian manifolds endowed with extended quasi-conformal curvature tensor. Specifically, we have considered Lorentzian para-Sasakian manifolds admitting extended quasi conformally $\phi$-flat, extended quasi conformally $\phi$-semi-symmetric and $K_{e}(\xi,U)\cdot S=0$ conditions and characterize some important results.

Downloads

Download data is not yet available.

Author Biographies

R. T. Naveen Kumar, Siddaganga Institute of Technology, Tumkur, India

Associate Professor, Department of Mathematics

P. Somashekhara, Govt First Grade College, Chikkamagaluru, Karnataka, INDIA.

Professor, Department of Mathematics

B. Phalaksha Murthy, Department of Mathematics, Govt First Grade College, Kadur-577 548, Karnataka, INDIA.

Professor, Department of Mathematics

Siva Kota Reddy Polaepalli, JSS Science and Technology University

Professor, Departmnet of Mathematics, JSS Science and Technology, Mysuru-570 006, India

References

\bibitem{sp10} U. C. De, and N. Guha ,\,{\em On generalized recurrent manifolds,}\,J. Nat. Acad. Math., 9 (1991), 85-92.

\bibitem{sp3} U. C. De,\, K. Matsumoto and A. A. Shaikh ,\,{\em On Lorentzian Para-Sasakian manifolds,}\,Rendicontidel Seminaro Matemetico di Messina, Serien II,
Supplemento al., 3 (1999), 149-156.

\bibitem{a12} U. C. De and A. Sarkar,\,\ {\em on the quasi conformal curvature tensor of a $(K, \mu)$ contact metric manifold,}\,\,
Math. Reports, 14 (64) 2(2012), 115-129.

\bibitem{spxx} R. S. Hamilton,\,{\em The Ricci flow on surfaces. In Mathematics and general relativity ( santa Cruz, CA, 1986),} Amer.
Math. Soc., Providence, RI, 71 (1988), 237-262.

\bibitem{sp15} S. Kobayashi and K. Nomizu,\,\,{\em Foundations of differential geometry,}\,\, Interscience Publishers, 1 (1963), 293-301.

\bibitem{sp13} K. Matsumoto,\,\,{\em On Lorentzian paracontact manifolds,}\,\,Bull. Yamagata Univ. Natur. Sci, 12 (1989), 151-156.

\bibitem{sp1} K. Matsumoto,\,\,{\em On Lorentzian almost paracontact manifolds,}\,\,Bull. Yamagata Univ. Natur. Sci, 12 (2) (1989), 151-156.

\bibitem{sp5} I. Mihai, U. C. De, and A. A. Shaikh,\,\,{\em On Lorentzian Para-Sasakian manifolds,}\,\,Korean J. Math. Sci., 6 (1999), 1-13.

\bibitem{sp2} I. Mihai, R. Rosca,\,\,{\em On Lorentzian Para-Sasakian manifolds,}\,\,Classical Analysis, World Scientific Publ., Singapore, (1992), 155-169.