Titlebook: Contact Geometry of Slant Submanifolds; Bang-Yen Chen,Mohammad Hasan Shahid,Falleh Al-Sola Book 2022 The Editor(s) (if applicable) and The

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,Curvature Inequalities for?Slant Submanifolds in?Pointwise Kenmotsu Space Forms,In this survey paper, we provide an overview of the geometry of slant submanifolds in pointwise Kenmotsu space forms, with a focus on the curvature properties that set basic relationships between the main intrinsic and extrinsic invariants of submanifolds.

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Some Basic Inequalities on Slant Submanifolds in Space Forms,In Differential Geometry, K?hler and Sasaki manifolds and their submanifolds are probably the most studied geometric objects, because of their interesting properties. In particular, the behavior of submanifolds in complex space forms and Sasakian space forms was investigated by many geometers.

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The Slant Submanifolds in the Setting of Metric ,-Manifolds,In this survey paper, we present a brief summary concerning the slant geometry for submanifolds in metric .-manifolds, together with some applications. The notion of .-structure was introduced by K.

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Slant, Semi-slant and Pointwise Slant Submanifolds of 3-Structure Manifolds,The purpose of this chapter is to study the geometry of various kinds of slant submanifolds in almost contact metric 3-structure manifolds.

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Slant Submanifolds of Conformal Sasakian Space Forms,Chen-Ricci inequality involving Ricci curvature and the squared mean curvature of different kinds of (slant) submanifolds of a conformal Sasakian space form tangent to the structure vector field of the ambient manifold are presented. Equality cases are also discussed.

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Slant Curves and Magnetic Curves,This chapter treats slant curves and magnetic curves in almost contact metric manifolds. Special attention is paid to magnetic curves in Sasakian manifolds. We describe magnetic slant curves in Sasakian space forms.

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Contact Slant Geometry of Submersions and Pointwise Slant and Semi-slant-Warped Product SubmanifoldNeill [.] and Gray [.] investigated the Riemannian submersion between Riemannian manifolds. These submersions were later extensively studied in differential geometry.

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,Semi-Slant ,-, Hemi-Slant ,-Riemannian Submersions and?Quasi Hemi-Slant Submanifolds,A differentiable map . between Riemannian manifolds . and . is called a Riemannian submersion if . is onto and it satisfies .for . vector fields tangent to ., where . denotes the derivative map.