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A survey on geometry of warped product submanifolds

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arxiv 1307.0236 v1 pith:J4WW3WRP submitted 2013-06-30 math.DG

A survey on geometry of warped product submanifolds

classification math.DG
keywords productwarpedmanifoldssubmanifoldssurveyarticlegeometryimportant
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The warped product $N_1\times_f N_2$ of two Riemannian manifolds $(N_1,g_1)$ and $(N_2,g_2)$ is the product manifold $N_1\times N_2$ equipped with the warped product metric $g=g_1+f^2 g_2$, where $f$ is a positive function on $N_1$. The notion of warped product manifolds is one of the most fruitful generalizations of Riemannian products. Such notion plays very important roles in differential geometry as well as in physics, especially in general relativity. Warped product manifolds have been studied for a long period of time. In contrast, the study of warped product submanifolds was only initiated around the beginning of this century. In this article we survey important results on warped product submanifolds in various ambient manifolds. It is the author's hope that this survey article will provide a good introduction on the theory of warped product submanifolds as well as a useful reference for further research on this vibrant research subject.

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  1. Warped Product Einstein Manifolds in Four Dimensions

    gr-qc 2026-06 unverdicted novelty 6.0

    Einstein warped products in 4D are classified algebraically via curvature matrix blocks into Petrov types (3+1 generically type I, 2+2 type D, 1+3 type O), with closed Riemannian half-conformally flat cases required t...