NOTES ON WEAKLY CYCLIC Z-SYMMETRIC MANIFOLDS

NOTES ON WEAKLY CYCLIC Z-SYMMETRIC MANIFOLDS

In this paper, we study some geometric structures of a weakly cyclic Z-symmetric manifold (briefly, $[W CZS]_n$). More precisely, we prove that a conformally flat $[W CZS]_n$ satisfying certain conditions is special conformally flat and hence the manifold can be isometrically immersed in an Euclidea...

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Veröffentlicht in:Taehan Suhakhoe hoebo 2018, Vol.55 (1), p.227-237
1. Verfasser: Kim, Jaeman
Format: Artikel
Sprache:kor
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Zusammenfassung:In this paper, we study some geometric structures of a weakly cyclic Z-symmetric manifold (briefly, $[W CZS]_n$). More precisely, we prove that a conformally flat $[W CZS]_n$ satisfying certain conditions is special conformally flat and hence the manifold can be isometrically immersed in an Euclidean manifold $E^n+1$ as a hypersurface if the manifold is simply connected. Also we show that there exists a $[W CZS]_4$ with one parameter family of its associated 1-forms.
ISSN:1015-8634