English

Correction to the quantum phase operator for photons

Quantum Physics 2017-06-01 v2

Abstract

The vector potential operator, A^\hat{\boldsymbol A}, is transformed and rewritten in terms of cosine and sine functions in order to get a clear picture of how the photon states relate to the A\boldsymbol A field. The phase operator, defined by E^=exp(iϕ^)\hat E = \exp(-i \hat \phi), is derived from this picture. The result has a close resemblance with the known Susskind-Glogower (SG) operator, which is given by E^SG=(a^ka^k)1/2a^k\hat E_{SG}=(\hat a_{\boldsymbol k} \hat a_{\boldsymbol k}^\dagger)^{-1/2} \hat a_{\boldsymbol k}. It will be shown that a^k\hat a_{\boldsymbol k} should be replaced by (a^k+a^k)(\hat a_{\boldsymbol k} + \hat a_{-\boldsymbol k}^\dagger) instead to yield E^=((a^k+a^k)(a^k+a^k))1/2(a^k+a^k)\hat E = ((\hat a_{\boldsymbol k} + \hat a_{-\boldsymbol k}^\dagger ) (\hat a_{\boldsymbol k}^\dagger + \hat a_{-\boldsymbol k}))^{-1/2} (\hat a_{\boldsymbol k} + \hat a_{-\boldsymbol k}^\dagger), which makes the operator unitary. E^\hat E will also be analyzed when restricted to the space of only forward moving photons with wave vector k\boldsymbol k. The resulting phase operator, E^+\hat E_+, will turn out to resemble the SG operator as well, but with a small correction: Whereas ESGE_{SG} can be equivalently written as E^SG=n=0nn+1\hat E_{SG} = \sum_{n=0}^{\infty} |n\rangle \langle n+1 |, the operator, E^+\hat E_+, is instead given by E^+=n=0annn+1\hat E_+ = \sum_{n=0}^{\infty} a_n |n \rangle \langle n+1|, where an=(n+1/2)!/(n!n+1)a_n = (n+1/2)!/(n! \sqrt{n+1}). The sequence, (an)n{0,1,2,}(a_n)_{n \in \lbrace 0, 1, 2, \ldots \rbrace}, converges to 11 from below for nn going to infinity.

Cite

@article{arxiv.1704.07637,
  title  = {Correction to the quantum phase operator for photons},
  author = {Mads J. Damgaard},
  journal= {arXiv preprint arXiv:1704.07637},
  year   = {2017}
}

Comments

10 pages, 2 figures, second version

R2 v1 2026-06-22T19:27:05.086Z