Complex Structures in Electrodynamics
摘要
In this paper we show that the basic external (i.e. not determined by the equations) object in Classical electrodynamics equations is a complex structure. In the 3-dimensional standard form of Maxwell equations this complex structure participates implicitly in the equations and its presence is responsible for the so called duality invariance. We give a new form of the equations showing explicitly the participation of . In the 4-dimensional formulation the complex structure is extracted directly from the equations, it appears as a linear map in the space of 2-forms on . It is shown also that may appear through the equivariance properties of the new formulation of the theory. Further we show how this complex structure combines with the Poincare isomorphism between the 2-forms and 2-tensors to generate all well known and used in the theory (pseudo)metric constructions on , and to define the conformal symmetry properties. The equations of Extended Electrodynamics (EED) do not also need these pseudometrics as beforehand necessary structures. A new formulation of the EED equations in terms of a generalized Lie derivative is given.
引用
@article{arxiv.math-ph/0106008,
title = {Complex Structures in Electrodynamics},
author = {Stoil Donev},
journal= {arXiv preprint arXiv:math-ph/0106008},
year = {2007}
}
备注
Latex2e, 19 pages