Stability of continuous-time quantum filters with measurement imperfections
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Publication:2344161
DOI10.1134/S1061920814030029zbMath1311.81013arXiv1312.0418OpenAlexW3098532013MaRDI QIDQ2344161
Hadis Amini, Pierre Rouchon, Clément Pellegrini
Publication date: 12 May 2015
Published in: Russian Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1312.0418
Quantum measurement theory, state operations, state preparations (81P15) Open systems, reduced dynamics, master equations, decoherence (81S22)
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Cites Work
- Unnamed Item
- Markov chains approximation of jump-diffusion stochastic master equations
- Large time behavior and convergence rate for quantum filters under standard non demolition conditions
- From repeated to continuous quantum interactions
- Analysis of solutions of a noncanonical Hamilton-Jacobi equation using the generalized characteristics method and the Hopf-Lax representations
- Quantum trajectories and measurements in continuous time. The diffusive case
- Quantum stochastic calculus and quantum nonlinear filtering
- Monotone metrics on matrix spaces
- Repeated quantum non-demolition measurements: convergence and continuous time limit
- Quantum-non-demolition measurement of the phase
- Existence, uniqueness and approximation of a stochastic Schrödinger equation: The diffusive case
- THE STABILITY OF QUANTUM MARKOV FILTERS
- Quantum Measurement and Control
- Stochastic Schrödinger Equations as Limit of Discrete Filtering
- An Open Systems Approach to Quantum Optics
- Exploring the Quantum
- Fidelity is a Sub-Martingale for Discrete-Time Quantum Filters
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