Research Area: Differential Geometry, Contact Geometry, Submanifolds
My research lies at the intersection of Differential Geometry and its applications, with a particular focus on Contact Geometry, Submanifold Theory, and Riemannian Geometry. I am interested in the geometric structures that arise in smooth manifolds and the interplay between their intrinsic and extrinsic properties. A significant part of my work explores contact metric manifolds and the geometry of their submanifolds, including curvature conditions and structural constraints. I study how properties such as normal curvature tensors, Ricci solitons, and geodesic behavior influence the classification and characterization of these manifolds.
Professional Body Membership
AMTI
RMS