Yayın tarihi için Matematik Bölümü listeleme
Toplam kayıt 134, listelenen: 41-60
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Helicoidal surfaces of value m
(Kyushu University, Instute of Mathematics for Industry, 2014)Abstract: We define a new kind helicoidal surface of value m. A rotational surface which is isometric to the helicoidal surface of value m is revealed. In addition, we calculate some differential geometric properties of ... -
Bour's minimal surface revisited: the irreducible implicit equation of the incomplete surface
(Çankırı Karatekin Üniversitesi, 2014)We focus on the differential geometry of the Bour’s minimal surface inEuclidean 3-space. We also calculate the mean curvature, the Gaussiancurvature, class, degree, index, total curvature, irreducible implicit equa-tion ... -
Algebraic surfaces of henneberg in minkowski 3-space
(Yüzüncü Yıl Üniversitesi, 2015) -
Minkowski geometride yüksek mertebeden cebirsel enneper yüzeyleri
(Ortadoğu Teknik Üniversitesi, 2015) -
Bour surface companions in space forms
(Bulgarian Academy of Sciences, 2015) -
Generalized bour's theorem in minkowski space form
(Yüzüncü Yıl Üniversitesi, 2015) -
A two parameter family of bour s surfaces in four space
(Bulgarian Academy of Sciences, 2015) -
Algebraic surfaces of the laplace-beltrami operators of the TF-type surfaces
(Yıldız Teknik Üniversitesi, 2015)We study on a new kind of surface covered by translation and factorable (TF-type) surfaces in the three dimensional Euclidean space. We calculate I and III Laplace-Beltrami operator surfaces of a TF-type ... -
Helicoidal surfaces of value (m,n) in 3-space
(Yıldız Teknik Üniversitesi, 2015)We define a new type helicoidal surface for natural numbers (m,n). We obtain a rotational surface which is isometric to the helicoidal surface of value (m,n) in three dimensional Euclidean space. -
Polynomial zero mean curvature surfaces in minkowski 3-space
(Yıldız Teknik Üniversitesi, 2015)We consider the family of the polynomial zero mean curvature surfaces in three dimensional Euclidean and Minkowski spaces and compute their classes, degrees and integral free representations. -
Quasi harmonic Bézier approximation of minimal surfaces for finding forms of structural membranes
(Elsevier, 2015)Numerical approximation of minimal surface is an important problem in form-finding of structural membranes. In this paper, we present a novel approach to construct minimal surface from a given boundary by quasi-harmonic ... -
Generalized bour s theorem
(Kuwait Journal of Science, 2015)We give the classical isometric minimal helicoidal and rotational surfaces using generalized Bour’s theorem in Euclidean 3-space. Furthermore, we investigate the minimality and have same Gauss map of the surfaces. -
I asymptotically lacunary equivalent set sequences defined by a modulus function
(Acta Universitatis Apulensis, 2015-03) -
Lacunary ideal convergence of double set sequences
(General Mathematics Notes, 2015-08) -
On I2 asymptotically λ2 statistical equivalent double sequences
(Konuralp Journal of Mathematics, 2015-10) -
Rotational hypersurface in 4-Space
(Ahi Evran Üniversitesi, 2016)We consider rotational hypersurface in the four dimensional Euclidean space. We calculate the mean and the Gaussian curvature, and some relations of the rotational hypersurface. Moreover, we give the Laplace-Beltrami ... -
On generalized euler spirals in E3
(2016)The Cornu spirals on plane are the curves whose curvatures are linear. Generalized planar cornu spirals and Euler spirals in E3, the curves whose curvatures are linear are deÖned in [1,5]. In this study, these curves are ... -
Enneper type surfaces in 4-space
(Ahi Evran Üniversitesi, 2016) -
Some characterizations of euler spirals In E3_1
(2016)In this study, some characterizations of Euler spirals in E3_1 have been presented by using their main property that their curvatures are linear. Moreover, discussing some properties of Bertrand curves and helices, the ... -
TF-type hypersurfaces in 4-Space
(Mersin Üniversitesi, 2016)We study on translation and factorable hypersurfaces in the four dimensional Euclidean space. We calculate implicit algebraic equations of the hypersurfaces.