Symmetry Properties of Electromagnetic Field in the Matter

Abstract

The sets (Fμ ), ( Fμ ) of linear functionals on the space < F,+,· > represent themself linear space < ,+,· > over the field of scalars P, which is dual to space < F,+,· >, but it is substantial, that given linear space is not self-dual. It has been found, that the partition of linear space < F,+,· > over the field of genuine scalars and pseudoscalars, the vectors in which are sets of contravariant and covariant electromagnetic field tensors and pseudotensors Fμ, Fμ, Fμ, Fμ, on 4 subspaces takes place. It corresponds to appearance of 4 kinds of electromagnetic field potential 4-vectors Aμ, which are transformed according to the representations of general Lorentz group with various symmetry relatively improper rotations. It has been found, that conserving quantity, corresponding to complex fields is complex charge. It is argued, that electromagnetic field in the matter is complex field and that two-parametric group (α,β) = U1(α) R(β), where R(β) is abelian multiplicative group of real numbers (excluding zero), determines the gauge symmetry of electromagnetic field. It is also argued, that free electromagnetic field is characterized by pure imagine charge.