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Your search keyword '"Aktaş, Buşra"' showing total 17 results
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17 results on '"Aktaş, Buşra"'

1. Notes concerning K\'ahler and anti-K\'ahler structures on quasi-statistical manifolds

Author

Gezer, Aydin, Aktas, Busra, and Durmaz, Olgun

Subjects
Mathematics - Differential Geometry
Abstract

Let $(\acute{N},g,\nabla )$\ be a $2n$-dimensional quasi-statistical manifold that admits a pseudo-Riemannian metric $g$ (or $h)$ and a linear connection $\nabla $ with torsion. This paper aims to study an almost Hermitian structure $(g,L)$ and an almost anti-Hermitian structure $(h,L)$ on a quasi-statistical manifold that admit an almost complex structure $L$. Firstly, under certain conditions, we present the integrability of the almost complex structure $L$. We show that when $d^\nabla L =0$ and the condition of torsion-compatibility are satisfied, $(\acute{N},g,\nabla ,$ $L)$ turns into a K\"{a}hler manifold. Secondly, we give necessary and sufficient conditions under which $(\acute{N},h,\nabla ,L)$ is an anti-K\"{a}% hler manifold, where $h$ is an anti-Hermitian metric. Moreover, we search the necessary conditions for $(\acute{N},h,\nabla ,L)$ to be a quasi-K\"{a}hler-Norden manifold.

Published
2023

3. On Constraint Manifolds of Lorentz Sphere

Author

Aktaş Buşra, Durmaz Olgun, and Gündoğan Hal˙t

Subjects
spherical open chain, constraint manifold, structure equation, split quaternion, 70b15, 76e07, 51a40, 93b17, Mathematics, QA1-939
Abstract

The expression of the structure equation of a mechanism is significant to present the last position of the mechanism. Moreover, in order to attain the constraint manifold of a chain, we need to constitute the structure equation. In this paper, we determine the structure equations and the constraint manifolds of a spherical open-chain in the Lorentz space. The structure equations of spherical open chain with reference to the causal character of the first link are obtained. Later, the constraint manifolds of the mechanism are determined by means of these equations. The geometric constructions corresponding to these manifolds are studied.

Published
2020
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4. An overview to analyticity of dual functions

Author

DURMAZ, Olgun, AKTAŞ, Buşra, and KEÇİLİOĞLU, Osman

Subjects
Matematik, Dual numbers, topology, dual analytic functions, General Medicine, Mathematics
Abstract

In this paper, the analyticity conditions of dual functions are clearly examined and the properties of the concept derivative are given in detail. Then, using the dual order relation, the dual analytic regions of dual analytic functions are constructed such that a collection of these regions forms a basis on $D^n$. Finally, the equivalent of the inverse function theorem in dual space is given by a theorem and proved.

Published
2022

7. The inequalities on dual numbers and their topological structures.

Author

AKTAŞ, Buşra, DURMAZ, Olgun, and GÜNDOĞAN, Halit

Subjects
*REAL numbers, *MATHEMATICS theorems, *NUMBER systems, *ABSOLUTE value, *MATHEMATICS
Abstract

Inequalities are frequently used in various fields of mathematics to prove theorems. The existence of inequalities contributes significantly to the foundations of such branches. In this paper, we study the properties of order relations in the system of dual numbers, which is inspired by order relations defined on real numbers. Besides, some special inequalities that are used in various fields of mathematics, such as Cauchy-Schwarz, Minkowski, and Chebyshev are studied in this framework. An example is also provided to validate our research findings. [ABSTRACT FROM AUTHOR]

Published
2023
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10. On Parallelizable Spheres in Semi Euclidean Space.

Author

Durmaz, Olgun, Aktaş, Buşra, and Gündoğan, Halit

Subjects
*NUMBER systems, *SPHERES, *SPACE, *COMPLEX numbers
Abstract

In Euclidean space, there exist four theorems which show that Sn sphere is not parallelizable for n 6 = 1, 3, 7. While three of them are shown by using Bott theorem, the last one is shown by using Hurwitz-Radon numbers. In this paper, a theorem and the proof of this theorem about parallelization of spheres in semi-Euclidean space is given. It is presented that some spheres are parallelizable with respect to specific number systems. [ABSTRACT FROM AUTHOR]

Published
2020

11. NEW APPROACHES ON DUAL SPACE.

Author

Durmaz, Olgun, Aktaş, Buşra, and Gündoğan, Halıt

Abstract

In this paper, we have explained how to define the basic concepts of differential geometry on Dual space. To support this, dual tangent vectors that have p as dual point of application have been defined. Then, the dual analytic functions defined by Dimentberg have been examined in detail, and by using the derivative of the these functions, dual directional derivatives and dual tangent maps have been introduced. [ABSTRACT FROM AUTHOR]

Published
2020
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16. 4 boyutlu minkowski uzayında null eğrilerin karakterizasyonu

Author

Aktaş, Buşra, Bektaş, Mehmet, and Matematik Anabilim Dalı

Subjects
Matematik, Mathematics
Abstract

Bu çalışma beş bölümden oluşmaktadır. Birinci bölüm; çalışmanın giriş kısmı olup, Bertrand eğrileri, Helisler ve Esnek olmayan akışlar üzerinde yapılan çalışmalar hakkında literatürdeki bilgiler incelendi. İkinci bölüm; R₂⁴ uzayı, Bertrand eğrileri, Genel Helisler ve Esnek olmayan akış için kullanılan temel tanımlar verildi. Üçüncü bölüm; R₂⁴ de Partially Null ve Pseudo Null eğrilerin Bertrand eğri tipleri incelendi. Dördüncü bölüm; R₂⁴ de Genel Helislerle ilgili bir karakterizasyon verildi. Beşinci bölüm; R₂⁴ de esnek olmayan akış kavramı tanımlandı ve Partially Null ve Pseudo Null eğrilerinin esnek olmayan akışları ile ilgili karakterizasyonlar elde edildi. Anahtar Kelimeler: Bertrand eğri, (1,3) Bertrand eğrisi, (2,3) Bertrand eğrisi, Akış, Esnek Olmayan Akış This thesis consist of five chapters. The first chapter has been devoted to the introduction. In the second chapter; fundamental definitions of semi-Euclidean space R₂⁴, Bertrand curves, Helices and Inextensible Flows have been given. In the third chapter; Bertrand curves of Partially Null ve Pseudo Null curves have been studied in semi-Euclidean space R₂⁴. In the fourth chapter; A characterization related to General Helices has been given. In the fifth chapter; Notion of Inextensible Flow was defined and The characterizations related to Inextensible Flows of Partially Null and Pseudo Null curves have been attained. Keywords: Bertrand Curve, (1,3) Bertrand curve, (2,3) Bertrand curve, Flow, Inextensible Flow. 57

Published
2015

17. Structure equations and constraint manifolds on Lorentz plane.

Author

Durmaz, Olgun, Aktaş, Buşra, and Gündoğan, Halit

Subjects
*MANIFOLDS (Mathematics), *LORENTZ spaces, *EQUATIONS
Abstract

Calculating the structure equation of a chain is important to represent the position of the end link on the chain. Furthermore, the structure equation helps to determine the constraint manifold of the chain. The constraint manifold satisfies to make geometric interpretations about the form that is obtained. What is more, the constraint forced on the positions of the end link by the rest of the chain is represented by the manifold. In Lorentz space, the structure equations change according to the causal characters of the first link. In this paper, we attain the structure equations of a planar open chain in terms of the causal character of the first link in this space. Later, the constraint manifolds of the chain by using these equations are given. Some geometric comments about these manifolds are explained. [ABSTRACT FROM AUTHOR]

Published
2019
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