Optical directional binormal magnetic flows with geometric phase: Heisenberg ferromagnetic model

WOS:000612544800041In this article, we analyze the geometric phase concerning the Heisenberg ferromagnetic version with directional geometric flows of quasi binormal magnetic particles by applying the quasi frame in space. We illustrate that the evolution from Heisenberg ferromagnetic unit is connected with the Berry phase or more usually regarded as a geometric phase. Furthermore, we research several integrability circumstances with quasi fields. By way of this different approach, we get some express for the given particle with the phase. Finally, we provide some different constructions for quasi curvatures of the quasi binormal magnetic particles by Heisenberg ferromagnetic model and we have a total phase for some quasi fields

Maxwellian evolution equations along the uniform optical fiber

Demirkol, Ridvan Cem/0000-0002-3459-1676; Korpinar, Talat/0000-0003-4000-0892WOS:000542065100011[No Abstract Available

On Velocity Magnetic Curves in Terms of Inextensible Flows in Space

WOS: 000445558300016In this work, we investigate inextensible flows of T-magnetic particles in space. Therefore, we obtain new results for inextensible flows T-magnetic curves of in space. Also, we characterize the inextensible of electric field by Lorentz equation. Finally, we obtain evolution equation of electric field in space

Geometric magnetic phase for timelike spherical optical ferromagnetic model

2-s2.0-85103164594In this paper, we give some constructions for the applications of optical magnetic Heisenberg spherical ferromagnetic chain of T - timelike magnetic particle by spherical de Sitter frame in de Sitter space. This aim may be concluded by well-known de Sitter frame or a new alternative spherical frame with an optical magnetic spherical Heisenberg ferromagnetic chain. Moreover, we achieve total magnetic phases of T- timelike magnetic particle evolutions. Finally, we obtain some numerical modeling of optical magnetic spherical Heisenberg ferromagnetic flows. © 2021 World Scientific Publishing Company

Binormal schrodinger system of Heisenberg ferromagnetic equation in the normal direction with Q -HATM approach

2-s2.0-85102167591In this paper, we first study the applications of the wave propagation flow in the normal direction, which is assumed to be the path of the propagated light radiated by Heisenberg ferromagnetic equation. Then the Coriolis phase is mainly used to demonstrate the relationship between the geometric magnetic phase and parallel transportation of the wave propagation field of the evolving light radiating in the normal orientation with Heisenberg ferromagnetic equation. Moreover, we investigate the geometric magnetic interpretation of the binormal evolution of the wave propagation field in the normal direction by considering the nonlinear fractional system with the repulsive type. Finally, we obtain numerical fractional solutions for the nonlinear fractional systems with the repulsive type by using the q-Homotopy analysis transform (q-HATM) method. © 2021 World Scientific Publishing Company

A new approach to alpha-magnetic particles with flows by spherical frame

WOS: 000454637500007In this work, we investigate alpha-magnetic particles by inextensible flows in sphere. We have the new results for inextensible flows of alpha-magnetic particles. Also, we characterize flows of electric field by a Lorentz equation. Finally, we obtain an evolution equation of electric field in sphere and we obtain magnetic flux density for this magnetic particles with some expression

New approach to uniformly quasi circular motion of quasi velocity biharmonic magnetic particles in the Heisenberg space

Korpinar, Talat/0000-0003-4000-0892WOS:000607080000001In this paper, we define concept of the uniformly quasi circular motion (UQCM) with biharmonicity condition in the Heisenberg space. That is, we aim to define a new class of UQCM in the three-dimensional Heisenberg space. We further improve an alternative method to find uniformly quasi circular potential electric energy of biharmonic velocity magnetic particles in the Heisenberg space. We also give the relationships between physical and geometrical characterizations of uniformly quasi circular potential electric energy. Finally, we illustrate important figures for uniformly quasi circular potential electric energy with respect to its electric field in the radial direction

On numerical solutions for the Caputo-Fabrizio fractional heat-like equation

In this article, Laplace homotopy analysis method in order to solve fractional heat-like equation with variable coefficients, are introduced. Laplace homotopy analysis method, founded on combination of homotopy methods and Laplace transform is used to supply a new analytical approximated solutions of the fractional partial differential equations in case of the Caputo-Fabrizio. The solutions obtained are compared with exact solutions of these equations. Reliability of the method is given with graphical consequens and series solutions. The results show that the method is a powerfull and efficient for solving the fractional heat-like equations with variable coefficients