Limits on Parameter Estimation of Quantum Channels
- URL: http://arxiv.org/abs/2201.01738v1
- Date: Wed, 5 Jan 2022 17:59:04 GMT
- Title: Limits on Parameter Estimation of Quantum Channels
- Authors: Vishal Katariya
- Abstract summary: We study the task of estimating unknown parameters encoded in a quantum channel in the sequential setting.
Our goal is to establish lower bounds (called Cramer-Rao bounds) on the estimation error.
- Score: 0.0
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: The aim of this thesis is to develop a theoretical framework to study
parameter estimation of quantum channels. We study the task of estimating
unknown parameters encoded in a channel in the sequential setting. A sequential
strategy is the most general way to use a channel multiple times. Our goal is
to establish lower bounds (called Cramer-Rao bounds) on the estimation error.
The bounds we develop are universally applicable; i.e., they apply to all
permissible quantum dynamics. We consider the use of catalysts to enhance the
power of a channel estimation strategy. This is termed amortization. The power
of a channel for a parameter estimation is determined by its Fisher
information. Thus, we study how much a catalyst quantum state can enhance the
Fisher information of a channel by defining the amortized Fisher information.
We establish our bounds by proving that for certain Fisher information
quantities, catalyst states do not improve the performance of a sequential
estimation protocol compared to a parallel one. The technical term for this is
an amortization collapse. We use this to establish bounds when estimating one
parameter, or multiple parameters simultaneously. Our bounds apply universally
and we also cast them as optimization problems. For the single parameter case,
we establish bounds for general quantum channels using both the symmetric
logarithmic derivative (SLD) Fisher information and the right logarithmic
derivative (RLD) Fisher information. The task of estimating multiple parameters
simultaneously is more involved than the single parameter case, because the
Cramer-Rao bounds take the form of matrix inequalities. We establish a scalar
Cramer-Rao bound for multiparameter channel estimation using the RLD Fisher
information. For both single and multiparameter estimation, we provide a no-go
condition for the so-called Heisenberg scaling using our RLD-based bound.
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