Continuous Observation of Quantum Systems
Abstract
In a series of papers in the 1980's Alexander Holevo proved a classification theorem for continuous quantum measurement processes, or, as they would today be called, stationary quantum trajectories in continuous time. His main tools were functional analytic in character: starting from a Bochner-type inequality he employed dilation techniques for positive definite kernels. Here we give an alternative, more probabilistic proof: we use weak convergence of measures and employ Levy's Continuity Theor...
Description / Details
In a series of papers in the 1980's Alexander Holevo proved a classification theorem for continuous quantum measurement processes, or, as they would today be called, stationary quantum trajectories in continuous time. His main tools were functional analytic in character: starting from a Bochner-type inequality he employed dilation techniques for positive definite kernels. Here we give an alternative, more probabilistic proof: we use weak convergence of measures and employ Levy's Continuity Theorem. We clarify the boundedness conditions in Holevo's theorem, and supply a simple example from quantum optics.
Source: arXiv:2607.01158v1 - http://arxiv.org/abs/2607.01158v1 PDF: https://arxiv.org/pdf/2607.01158v1 Original Link: http://arxiv.org/abs/2607.01158v1
Please sign in to join the discussion.
No comments yet. Be the first to share your thoughts!
Jul 2, 2026
Quantum Computing
Quantum Physics
0