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arXiv:2402.05470v2 Announce Type: replace
Abstract: Let $M$ be a complete Riemannian manifold with constant scalar curvature $R$ and dimension $n\geq 3,$ and let $f: M\rightarrow M^{n+k}(c)$ be a proper isometric immersion with flat normal bundle and type $(1, n-1)$ in a complete simply-connected Riemannian space form $M^{n+k}(c)$ of constant sectional curvature $c$ and dimension $n+k.$ Our first result is global and states that $R\geq 0$ if $c= 0,\ R> \frac{(n-1)(n-2)}{2}c$ if $c> 0,$ and $R\geq \frac{n(n-1)}{2}c$ if $c< 0.$ Our second result is of a local character and states that, if in addition we assume that $c\geq 0$ and the mean curvature field of the immersion is parallel in the normal bundle, then $M$ has non-negative sectional curvature.
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