Yazar "Yılmaz, Süha" için Makale Koleksiyonu listeleme
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A Note on Some Characterizations of Curves Due to Bishop Frame in Euclidean Plane E^2
Yılmaz, Süha; Ünlütürk, Yasin (2016-12)In this paper, we first obtain the differential equation characterizing position vector of a regular curve in Euclidean plane E^2 . Then we study the special curves such as Smarandache curves, curves of constant breadth ... -
A Note on Special Curves in E^4
Yılmaz, Süha; Nizamoğlu, Şuur (2016-06)This article has consisted of a part of doctorate thesis by Süha Yılmaz. Firstly, Frenet formulas are given in E^4. Later, characterizations of regular and inclined curves are studied in E^4. It has been given that a ... -
Characterizations of Some Associated and Special Curves to Type-2 Bishop Frame in E^3
Yılmaz, Süha (2015-12)In this paper, we investigate associated curves according to type-2 Bishop frame in E^3. In addition, necessary and sufficient conditions for a curve to be a regular one are studied to the mentioned frame. Finally we give ... -
CHARACTERIZATIONS OF SOME ASSOCIATED AND SPECIAL CURVES TO TYPE-2 BISHOP FRAME IN E^3
Yılmaz, Süha (Kırklareli Üniversitesi, 2016)In this paper, we investigate associated curves according to type-2 Bishop frame in E^3. In addition, necessary and sufficient conditions for a curve to be a regular one are studied to the mentioned frame. Finally we give ... -
A NOTE ON SOME CHARACTERIZATIONS OF CURVES DUE TO BISHOP FRAME IN EUCLIDEAN PLANE E2
Yılmaz, Süha; Ünlütürk, Yasin (Kırklareli Üniversitesi, 2016)In this paper, we first obtain the differential equation characterizing position vector of a regularcurve in Euclidean plane 2 E . Then we study the special curves such as Smarandache curves,curves of constant breadth due ... -
A NOTE ON SPECIAL CURVES IN E^4
Yılmaz, Süha; Nizamoğlu, Şuur (Kırklareli Üniversitesi, 2016)This article has consisted of a part of doctorate thesis by Süha Yılmaz [7]. Firstly, Frenet formulas are given in E^4. Later, characterizations of regular and inclined curves are studied E^4. It has been ...