Author/Authors :
Arslan, Kadri Uludag University - Department of Mathematics, TURKEY , Bayram, Bengu Kılıc Balıkesir University - Department of Mathematics, TURKEY , Bulca, Betul Uludag University - Department of Mathematics, TURKEY , Kim, Young Ho Kyunpook National University - Department of Mathematics, KOREA , Murathan, Cengizhan Uludag University - Department of Mathematics, Turkey , Ozturk, Gunay Kocaeli University - Department of Mathematics, Turkey
Abstract :
In the present article we study the rotational embedded surfaces in E^4. The rotational embedded surface was first studied by G. Ganchev and V. Milousheva as a surface in E^4. The Otsuki (non-round) sphere in 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.
Keywords :
Rotation surface , gauss map , finite type , Pointwise 1 , type
