Geometry of CRS bi-warped product submanifolds in Sasakian and cosymplectic manifolds

Abstract

In this paper, we prove that there are no proper CRS bi-warped product submanifolds other than contact CR-biwarped products in Sasakian manifolds. On the other hand, we prove that if M is a CRS bi-warped product of the form M=NT ×f1Nn1×f2 Nn2θ in a cosymplectic manifold M, then its second fundamental form h satisfies the inequality: \|h\|2≥ 2n1\|∇( f1)\|2+2n2(1+22θ)\|∇( f2)\|2, where NT,\, Nn1 and Nn2θ are invariant, anti-invariant and proper pointwise slant submanifolds of M, respectively, and ∇( f1) and ∇( f2) denote the gradients of f1 and f2, respectively. Several applications of this inequality are given. At the end, we provide a non-trivial example of bi-warped products satisfying the equality case.