Betül BULCA, Kadri ARSLAN, Günay ÖZTÜRK, Bengü Kılıç BAYRAM, Young Ho KIM

Rotational embeddings in $Bbb{E}^4$ with pointwise 1-type gauss map

In the present article we study the rotational embedded surfaces in $Bbb{E}^4$ . The rotational embedded surface was first studied by G. Ganchev and V. Milousheva as a surface in $Bbb{E}^4$ . The Otsuki (non-round) sphere in $Bbb{E}^4$ is one of the special examples of this surface. Finally, we give necessary and sufficient conditions for the flat Ganchev-Milousheva rotational surface to have pointwise 1-type Gauss map.

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