Intrinsic and Extrinsic Geometry of Kählerian Slant Submanifolds in Complex Space Forms

Andreea Olteanu; Mohammed Mohammed; Ion Mihai; Sfundo Cebolenkosi Gumede

doi:10.3390/math14010071

,

and

¹

Faculty of Land Reclamation and Environmental Engineering, University of Agronomic Sciences and Veterinary Medicine of Bucharest, 011464 Bucharest, Romania

²

Department of Mathematical Sciences, Mangosuthu University of Technology (MUT), 511 Griffiths Mxenge Highway, Umlazi 4031, South Africa

³

National Institute for Theoretical and Computational Sciences (NITheCS), Stellenbosch 3201, South Africa

⁴

Faculty of Mathematics and Computer Science, University of Bucharest, 010014 Bucharest, Romania

Mathematics2026, 14(1), 71;https://doi.org/10.3390/math14010071
(registering DOI)

This article belongs to the Special Issue Recent Studies in Differential Geometry and Its Applications

Version Notes

Order Reprints

Abstract

The study of complex space forms plays a central role in differential geometry, as these manifolds provide a natural framework for exploring geometric structures endowed with rich symmetries, extending both Riemannian and Kählerian geometries. In this paper, we extend the definition of Kählerian slant submanifolds when the ambient complex space form admits a quarter-symmetric connection. Furthermore, we establish sharp relationships between intrinsic and extrinsic geometric invariants of Kählerian slant submanifolds in complex space forms admitting a quarter-symmetric connection.

Keywords:

Chen invariant; Chen inequalities; Kählerian slant; semi-symmetric connection; non-metric connection; quarter symmetric connection

Intrinsic and Extrinsic Geometry of Kählerian Slant Submanifolds in Complex Space Forms

Abstract

Article Metrics

Citations

Article Access Statistics