Explicit effective Hamiltonians for general linear quantum-optical networks
arXiv:quant-ph/0306123 · doi:10.1088/1464-4266/6/1/L01
Abstract
Linear optical networks are devices that turn classical incident modes by a linear transformation into outgoing ones. In general, the quantum version of such transformations may mix annihilation and creation operators. We derive a simple formula for the effective Hamiltonian of a general linear quantum network, if such a Hamiltonian exists. Otherwise we show how the scattering matrix of the network is decomposed into a product of three matrices that can be generated by Hamiltonians.