Quaternions, Maxwell Equations and Lorentz Transformations
Scientific Paper | |
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Title | Quaternions, Maxwell Equations and Lorentz Transformations |
Read in full | Link to paper |
Author(s) | Jose Luis Lopez-Bonilla |
Keywords | Maxwell equations, rotations, electromagnetic field |
Published | 2005 |
Journal | Apeiron |
Volume | 12 |
Number | 4 |
No. of pages | 14 |
Read the full paper here
Abstract
In this work: a) We show that the invariance of the Maxwell equations under duality rotations brings into scene to the complex vector (c B iE ? ?), whose components allow to construct a quaternionic equation for the electromagnetic field in vacuo. b) For any analytic function f of the complex variable z, it is possible to prove that is a Debye potential for itself, which permits to reformulate the corresponding Cauchy-Riemann relations. Here we show that the Fueter conditions- when z is a quaternion- also accept a similar reformulation and a very compact quaternionic expression. c) We exhibit how the rotations in three and four dimensions can be described through a complex matrix relation or equivalently by a quaternionic formula.