The geometrical interpretation of the photon position operator

Abstract

It is shown that the photon position operator X with commuting components can be written in the momentum representation as X=i D, where D is a flat connection in the tangent bundle T(R3 \ (0,0,k3) ∈ R3 : k3 ≥ 0\) over R3 \ (0,0,k3) ∈ R3 : k3 ≥ 0\ equipped with the Cartesian structure. Moreover, D is such that the tangent 2-planes orthogonal to the momentum are parallelly propagated with respect to D and, also, D is an anti-Hermitian operator with respect to the scalar product | H-2s | . The eigenfunctions X (x) of the position operator X are found.