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Toplam kayıt 257, listelenen: 200-219
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SA Özelliğine Sahip Serbest Modüller Üzerine
(2016)Bir ? halkasına, eğer iki dik toplananının arakesiti yine bir dik toplanan ise dik toplananların arakesit özelliğine (SIP) sahiptir denir. Bir ?-? modülüne, eğer her ????? ayrışımı ve ? nın ? içindeki her ? tümleyeni için ... -
Scattering of sound waves by an infinite grating composed of rigid plates
(Elsevier Science BV, 2007)A plane sound wave is incident at an angle theta upon an infinite array of rigid plates, equally spaced and lying along the y-axis, where (x, y) are two-dimensional Cartesian coordinates. The boundary value problem is ... -
Schrodinger-Lichnerowicz Like Formula on Kahler-Norden Manifolds
(World Scientific Publ Co Pte LTD, 2012)A new kind of spinors and Dirac operator are introduced on Kahler-Norden manifolds in [Spinors on Kahler-Norden manifolds, J. Nonlinear Math. Phys. 17(1) (2010) 27-34]. In this work the square D-2 of the Dirac operator D ... -
Seiberg-Witten Equations on 8-Dimensional Manifolds With Su(4)-Structure
(World Scientific Publ Co Pte LTD, 2013)Seiberg-Witten equations on 8-manifolds with Spin(7)-holonomy are introduced in [A. H. Bilge, T. Dereli and S. Kocak, Monopole equations on 8-manifolds with Spin(7) holonomy, Commun. Math. Phys. 203(1) (1999) 21-30] and ... -
Seiberg-Witten Equations on Four-Dimensional Lorentzian Spin(C) Manifolds
(World Scientific Publ Co Pte LTD, 2011)New kind of spinors are introduced on four-dimensional Lorentzian Spin(c) manifolds in [1]. We define Dirac operator on such spinors. In [2] Seiberg-Witten-like equations are written down on Minkowski space. In the present ... -
Seiberg-Witten Equations on Pseudo-Riemannian Spin(c) Manifolds With Neutral Signature
(Ovidius University Press, 2012)Pseudo-Riemannian spin(c) manifolds were introduced by Ikemakhen in [7]. In the present work we consider pseudo-Riemannian 4-manifolds with neutral signature whose structure groups are SO+ (2, 2). We prove that such manifolds ... -
Seiberg-Witten equations on pseudo-Riemannian spinc manifolds with neutral signature
(Ovidius University, 2012)Pseudo-Riemannian spinc manifolds were introduced by Ikemakhen in [7]. In the present work we consider pseudoRiemannian 4-manifolds with neutral signature whose structure groups are SO+(2; 2). We prove that such manifolds ... -
Seiberg-Witten Like Equations on Pseudo-Riemannian Spin.. Manifolds with G(2(2))* Structure
(Hindawi LTD, 2016)We consider 7-dimensional pseudo-Riemannian spin(c) manifolds with structure group G(2(2))*. On such manifolds, the space of 2-forms splits orthogonally into components Lambda M-2 = Lambda(2)(7) circle plus Lambda(2)(14). ... -
Seiberg-Witten type monopole equations on 8-manifolds with Spin(7) holonomy as minimizers of a quadratic action
(Springer, 2003)We obtain an elliptic system of monopole equations on 8-manifolds with Spin(7) holonomy by minimizing an action involving negative spinors coupled to an abelian gauge field. -
Seiberg-Witten-like equations on 5-dimensional contact metric manifolds
(Scientific Technical Research Council Turkey-Tubitak, 2014)In this paper, we write Seiberg-Witten-like equations on contact metric manifolds of dimension 5. Since any contact metric manifold has a Spin(e)-structure, we use the generalized Tanaka-Webster connection on a Spin(e) ... -
Seiberg-Witten-like equations on 6-dimensional SU(3)-manifolds
(Balkan Society of Geometers, 2015)It is known that Seiberg-Witten monopole equations are important for the investigations of smooth 4-manifolds. In this study we write the similar equations for 6-dimensional manifold M with structure group SU(3). For Dirac ... -
Seiberg-Witten-like equations on 7-manifolds with G(2)-structure
(Norbert Euler, 2005)The Seiberg-Witten equations are of great importance in the study of topology of smooth four-dimensional manifolds. In this work, we propose similar equations for 7-dimensional compact manifolds with G(2)-structure. -
Seiberg-Witten-Like Equations Without Self-Duality on Odd Dimensional Manifolds
(Global Science Press, 2018)In this paper, Seiberg-Witten-like equations without self-duality are defined on any smooth 2n+1-dimensional Spinc manifolds. Then, a non-trivial solution is given on the strictly-Pseudoconvex CR-5 manifolds endowed with ... -
Seiberg–Witten-like equations on 5-dimensional contact metric manifolds
(2014)In this paper, we write Seiberg–Witten-like equations on contact metric manifolds of dimension 5. Since any contact metric manifold has a Spinc -structure, we use the generalized Tanaka–Webster connection on a Spinc spinor ... -
Self-dual gauge fields in eight dimensions
(1997)Self-dual gauge fields in even dimensional spaces are characterised by a set of constraints on the eigenvalues of F. We derive a new topological bound (Latin small letter esh sign)M(F, F)2 ? ?M P12 on a compact 8-manifold ... -
A self-similar group in the sense of iterated function system
(2012)In this paper, first we give an iterated function system whose attractor is G m, a subgroup of the automorphism group of an (m + 1) -ary rooted tree. We also show that G m is a self-similar group in the sense of IFS. Then ... -
Self-similar groups in the sense of an iterated function system and their properties
(Academic Press Inc Elsevier Science, 2013)The notion of self-similarity in the sense of iterated function system (IFS) for compact topological groups is given by S. Kocak in Definition 3. In this work, first we give the definition of strong self-similar group in ... -
Simetrik bilineer uzayların tensör çarpımlarının Clifford cebirleri üzerine bir teorem
(2006)İki simetrik bilineer uzayın tensör çarpımının da simetrik bilineer uzay olduğu bilinmektedir. Bu çalışmada reel bilineer uzayların tensör çarpım uzayı üzerindeki Clifford cebri için bir izomorfizma teoremi verilmiştir. -
The snowflake curve as an attractor of an iterated function system
(2013)Although the snowflake curve, the boundary of the Koch snowflake, is one of the well-known fractals, there is no iterated function system (IFS) for it in the literature. In this study, we give an IFS for this familiar closed curve