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An Optimal Inequality for Warped Product Pointwise Semi-Slant Submanifolds in Complex Space Forms
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In this paper, we utilize advanced optimization techniques on Riemannian submanifolds to establish two distinct inequalities concerning the generalized normalized δ-Casorati curvatures of warped product pointwise semi-slant (WPPSS) submanifolds within complex space forms. We further identify the precise conditions under which these inequalities attain equality, providing valuable insights into their geometric and structural significance. Additionally, we also present results involving harmonic and Hessian functions, revealing a broader connection between curvature properties and analytic functions.
Title: An Optimal Inequality for Warped Product Pointwise Semi-Slant Submanifolds in Complex Space Forms
Description:
In this paper, we utilize advanced optimization techniques on Riemannian submanifolds to establish two distinct inequalities concerning the generalized normalized δ-Casorati curvatures of warped product pointwise semi-slant (WPPSS) submanifolds within complex space forms.
We further identify the precise conditions under which these inequalities attain equality, providing valuable insights into their geometric and structural significance.
Additionally, we also present results involving harmonic and Hessian functions, revealing a broader connection between curvature properties and analytic functions.
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