On Wintgen ideal submanifolds satisfying some pseudo-symmetry type curvature conditions
Abstract
Let M be a Wintgen ideal submanifold of dimension n in a real space form Rn+m(k) of dimension (n+m) and of constant curvature k, n > 3, m = 1 or m > 1. Let g, R, Ricc, g /\ Ricc and C be the metric tensor, the Riemann-Christoffel curvature tensor, the Ricci tensor, the Kulkarni-Nomizu product of g and Ricc, and the Weyl conformal curvature tensor of M, respectively. In this paper we study Wintgen ideal submanifolds M in real space forms Rn+m(k), n > 3, m = 1 or m > 3, satisfying the following pseudo-symmetry type curvature conditions: (i) R.C and Q(g,R) (resp., Q(g,C), Q(g,g/), Q(Ricc,R) or Q(Ricc,g/)) are linearly dependent; (ii) C.R and Q(g,R) (resp., Q(g,C), Q(g,g/), Q(Ricc,R) or Q(Ricc,g/)) are linearly dependent; (iii) R.C - C.R and Q(g,R) (resp., Q(g,C), Q(g,g/), Q(Ricc,R) or Q(Ricc,g/)) are linearly dependent.
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