___

• [1] Arslan, K., Ezentas, R., Mihai, I., Özgür, C., Certain inequalities for submanifolds in (k, µ)--contact space forms. Bull. Aust. Math. Soc., 64 (2001), no. 2, 201-212.
• [2] Bansal, P., Shahid, M. H., Non-existence of Hopf real hypersurfaces in complex quadric with recurrent Ricci tensor, Appl. Appl. Math. 13 (2018), in press.
• [3] Bansal, P., Shahid, M. H., Optimization approach for bounds involving generalised normalised δ-Casorati curvatures, Advances in Intelligent Systems and Computing, 741 (2018), 227-237.
• [4] Bansal, P., Shahid, M. H., Bounds of generalized normalized δ-Casorati curvatures for real hypersurfaces in the complex quadric, Arab. J. Math., (2018), in press.
• [5] Berndt, J., Suh, Y. J., Real hypersurfaces with isometric Reeb flow in complex quadrics, Internat. J. Math., 24 (2013), 1350050, 18pp.
• [6] Blair, D. E., Contact manifolds in Riemannian Geometry. Lecture Notes in Math, 509, Springer-Verlag, Berlin, (1976).
• [7] Chen, B. Y., Differential Geometry ofWarped Product Manifolds and Submanifolds,World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ, 2017.
• [8] Chen, B. Y., Geometry of warped products as Riemannian submanifolds and related problem, Soochow J. Math., 28 (2002), 125-157.
• [9] Chen, B. Y., Some pinching and classification theorems for minimal submanifolds, Arch. Math. (Basel), 60 (1993), 568-578.
• [10] Chen, B. Y., A Riemannian invariant and its applications to submanifold theory, Result. Math., 27 (1995), 17-26.
• [11] Chen, B. Y., Ideal Lagrangian immersions in complex space forms, Math. Proc. Cambridge Philos. Soc., 128 (2000), 511-533.
• [12] Chern, S. S., Minimal Submanifolds in a Riemannian Manifold, University of Kansas Press, (1968).
• [13] Cioroboiu, D., Chen, B. Y., inequalities for semi-slant submanifolds in Sasakian space forms, Int. J. Math. Math. Sci, 27 (2003), 1731-1738.
• [14] Hayden, H. A., Subspaces of a space with torsion, Proc. Lond. Math. Soc., 34 (1932), 27-50.
• [15] Mihai, A., Özgür, C., Chen inequalities for submanifolds of real space forms with a semi-symmetric metric connection, Taiwanese J. Math., 14 (2010), 1465-1477.
• [16] Reckziegel, H., On the geometry of the complex quadric, in :Geometry and Topology of Submanifolds VIII (Brussels/Nordfjordeid 1995), World Sci. Publ., River Edge, NJ, (1995), 302-315.
• [17] Suh, Y. J., Real hypersurfaces in the complex quadric with parallel Ricci tensor, Advances in Mathematics, 281 (2015), 886-905.
• [18] Suh, Y. J., Real hypersurfaces in the complex quadric with Reeb parallel shape operator, Internat. J. Math., 25 (2014), 1450059, 17pp.
• [19] Suh, Y. J., Psuedo-Einstein real hypersurfaces in the complex quadric, Math. Nachr., 290 (2017), no. 11-12, 1884-1904.
• [20] Yano, K., On semi-symmetric metric connection, Rev. Roumaine Math. Pures Appl., 15 (1970), 1579-1586.