Construction of normally biharmonic submanifolds
Abstract
We examine biharmonic submanifolds within warped product structures. For a submanifold (M,g)⊂ (N,h) and a positive smooth function f:I+, we study the inclusion :(I× M,g) (I× N,h), where g=dt2+f2g and h=dt2+f2h. We relate the tension and bitension fields of to the warping function and the geometry of M. We further characterize tangentially and normally biharmonic cases via differential conditions on f, and interpret these conditions in terms of the Ricci curvature of (M,g) and (I× M,g).
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