Warped-twisted product semi-slant submanifolds
Abstract
We introduce the notion of warped-twisted product semi-slant submanifolds of the form _{f_2}M^{T}\times_{f_1}M^{\theta} with warping function f_2 on M^\theta and twisting function f_1, where M^T is a holomorphic and M^\theta is a slant submanifold of a globally conformal Kaehler manifold. We prove that a warped-twisted product semi-slant submanifold of a globally conformal Kaehler manifold is a locally doubly warped product. Then we establish a general inequality for doubly warped product semi-slant submanifolds and get some results for such submanifolds by using the equality sign of the general inequality.
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