Relation between Optical Fresnel transformation and quantum tomography in two-mode entangled case

Abstract

Similar in spirit to the preceding work [Opt. Commun. 282 (2009) 3734] where the relation between optical Fresnel transformation and quantum tomography is revealed, we study this kind of relationship in the two-mode entangled case. We show that under the two-mode Fresnel transformation the bipartite entangled state density |eta><eta| becomes density operator F2|eta><eta|F2 dag=|eta>r,s<eta|, which is just the Radon transform of the two-mode Wigner operator (sigma,gama) in entangled form, where F2 is an two-mode Fresnel operator in quantum optics, and s,r are the complex-value expression of (A, B, C,D). So the probability distribution for the Fresnel quadrature phase is the tomography (Radon transform of the two-mode Wigner function), correspondingly, s,r<eta|phi>=<eta|F2dag|phi>. Similarly, we find a simial conclusion in the `frequency` domain.