Başlık için Matematik Bölümü Diğer Yayınlar Koleksiyonu listeleme
Toplam kayıt 80, listelenen: 52-71
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New definitions about ai statistical convergence with respect to a sequence of modulus functions and lacunary sequences
(International Conference on Recent Advances in Pure and Applied Mathematics (ICRAPAM), 2016-05-19)In this study, we introduce the notion of A^{I}-lacunary statistical convergence, strongly A^{I}-lacunary convergence with respect to a sequence of modulus functions. We study some collections between them. Also, we ... -
New sequence spaces with respect to a sequence of modulus functions
(3rd International Intuitionistic Fuzzy Sets and Contemporary Mathematics Conference (IFSCOM 2016), 2016-08-29)In this talk, we introduce the notion of AI-invariant statistical convergence, AI-lacunary invariant statistical convergence with respect to a sequence of modulus functions. We establish some inclusion relations between ... -
A numerical investigation of VMS-POD model for darcy-brinkman equations
(Proceedings of the World Congress on Engineering, 2018)We extend the variational multiscale proper orthogonal decomposition reduced order modeling (VMSPOD) to flows governed by double diffusive convection. We present stability and convergence analysis for it, and give results ... -
On bour's minimal surface
(Ordu Üniversitesi, 2013) -
On bour's minimal surface
(Katholieke Leuven University, 2012) -
On fourth fundamental form of the translation hypersurface
(2020-12-10)We examine the fourth fundamental form of the translation hypersurface in the four dimensional Euclidean space. We also discuss I, II, III and IV fundamental forms of a translation hypersurface. -
On the gauss map of a class of hypersurfaces in H4
(AIP Conf. Proc. 2037, 020026-1–020026-8, 2018)We consider hypersurfaces of Riemannian space forms in terms of the type of their Gauss map, spherical Gauss mapor hyperbolic Gauss map. We give a brief summary of results on submanifolds withLkfinite type Gauss map fork>0. ... -
On the gauss map of the rotational 3-surface in 4-space
(Amasya Üniversitesi, 2017)We consider the Gauss map of the rotational hypersurface in the four dimensional Euclidean space. We define the mean curvature and the Gaussian curvature formulas. We also find some geometric ... -
On the mean gaussian second gaussian and the second mean curvature of the helicoidal surfaces with lightlike axis in R 1 3
(Zonguldak Karaelmas Üniversitesi, 2006) -
One sided Henry Smith surface
(International Conference on Computational Mathematics and Engineering Sciences, 2019)We focus differential geometry of the Henry Smith surface in the three dimensional Euclidean space. We calculate the Gaussian and the mean curvatures of the surface, drawing its figure. In addition, we find algebraic ... -
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. -
Reel analiz ders notları
(1995) -
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 ... -
Rotational hypersurfaces in E6
(Mersin Üniversitesi, 2018) -
Sayılar teorisi ders notları
(1996) -
The second laplace-Beltrami operator on rotational hypersurfaces in the euclidean 4-space
(Yıldız Teknik Üniversitesi, 2017)We consider rotational hypersurface in the four dimensional Euclidean space. Wecalculate the mean curvature and the Gaussian curvature, and some relations of therotational hypersurface. Moreover, we de ne the second ... -
Soyut cebir ders notları
(1995) -
Soyut matematik ders notları
(1993) -
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.