Supersymmetric Hamiltonian and Vortex Formation Model in a Quantum Nonlinear System in an Inhomogeneous Electromagnetic Field

Manzetti, Sergio; Trounev, Alexander

doi:10.1002/adts.201900011

Cited by 5 publications

References 51 publications

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Analytical Solutions for a Supersymmetric Wave‐Equation for Quasiparticles in a Quantum System

Manzetti

Trounev

2019

Advcd Theory and Sims

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Vortices and quasiparticles have been studied for 2D systems over the past decades in relation to the development of technologies in quantum electromagnetics, optics, and quantum computation. Deriving new equations for quasiparticles in quantum systems is therefore a critical part of quantum physics. Recently, a supersymmetric wave equation has been developed which describes quasiparticles and vorticity under the influence of electromagnetic fields which has been studied numerically. The analytical solutions of the supersymmetric wave‐equation are presented by increasing levels of energy. It is shown that the derived linear and nonlinear models of the supersymmetric wave‐equation can represent respectively symmetric and asymmetric vorticity formed in a confined rotating torus. The models described are suitable to represent vorticity formed in 2D and 3D electron gas and can be of significant relevance to future research in quantum electromagnetics.

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Analytical Solutions for a Supersymmetric Wave‐Equation for Quasiparticles in a Quantum System

Manzetti

Trounev

2019

Advcd Theory and Sims

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Electromagnetic Vorticity in a Square‐Well Crystal System Described by a Supersymmetric Wave‐Equation

Manzetti

Trounev

2019

Advcd Theory and Sims

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Vortices occur under all electromagnetic phenomena in quantized systems, as well as macroscopic systems. In particular, vorticity in square‐wells is of great appeal to the scientific community, as it models electromagnetic fields and formation of condensates in crystal lattices. A supersymmetric wave‐equation (SWE) is devised to model vorticity in a square‐well system, and the numerical results of several states of vorticity are shown by increased energy of the system. It is shown that square‐well vorticity obeys specific symmetries when modeled with the SWE and generates non‐overlapping vortices of the same spin. Nucleation of vortices when subjected to increased angular velocity and formation of giant vortices is also shown. This is of importance to the modeling of magnetism in quantum systems, and the generation of new results to describe quantum vorticity.

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A primer on eigenvalue problems of non-self-adjoint operators

Kumar,

Hiremath,

Manzetti

2024

Anal.Math.Phys.

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Supersymmetric Hamiltonian and Vortex Formation Model in a Quantum Nonlinear System in an Inhomogeneous Electromagnetic Field

Cited by 5 publications

References 51 publications

Analytical Solutions for a Supersymmetric Wave‐Equation for Quasiparticles in a Quantum System

Analytical Solutions for a Supersymmetric Wave‐Equation for Quasiparticles in a Quantum System

Electromagnetic Vorticity in a Square‐Well Crystal System Described by a Supersymmetric Wave‐Equation

A primer on eigenvalue problems of non-self-adjoint operators

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