Energy Levels and Wave Functions of Vector Bosons in Homogeneous   Magnetic Field

K.Sogut; A.Havare; I.Acikgoz

arXiv:hep-th/0110228·hep-th·November 26, 2008

Energy Levels and Wave Functions of Vector Bosons in Homogeneous Magnetic Field

K.Sogut, A.Havare, I.Acikgoz

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TL;DR

This paper derives the energy levels and wave functions of spin-1 vector bosons in a homogeneous magnetic field using an algebraic approach with Laguerre Polynomials.

Contribution

It introduces an algebraic method to determine energy levels and wave functions of vector bosons in magnetic fields, utilizing Laguerre Polynomials.

Findings

01

Energy levels of spin-1 particles are obtained algebraically.

02

Wave functions are expressed in terms of Laguerre Polynomials.

03

The method simplifies calculations of vector bosons in magnetic fields.

Abstract

We aimed to obtain the energy levels of spin-1 particles moving in a constant magnetic field. The method used here is completely algebraic. In the process to obtain the energy levels the wave function is choosen in terms of Laguerre Polynomials.

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