Diluted maximum-likelihood algorithm for quantum tomography
arXiv:quant-ph/0611244 · doi:10.1103/PhysRevA.75.042108
Abstract
We propose a refined iterative likelihood-maximization algorithm for reconstructing a quantum state from a set of tomographic measurements. The algorithm is characterized by a very high convergence rate and features a simple adaptive procedure that ensures likelihood increase in every iteration and convergence to the maximum-likelihood state. We apply the algorithm to homodyne tomography of optical states and quantum tomography of entangled spin states of trapped ions and investigate its convergence properties.
v2: Convergence proof added