scholarly journals Simultaneous Perturbation Stochastic Approximation of the Quantum Fisher Information

Quantum ◽  
2021 ◽  
Vol 5 ◽  
pp. 567
Author(s):  
Julien Gacon ◽  
Christa Zoufal ◽  
Giuseppe Carleo ◽  
Stefan Woerner
Keyword(s):  
Stochastic Approximation ◽  
Fisher Information ◽  
Gradient Descent ◽  
Information Matrix ◽  
Quantum Fisher Information ◽  
Dimensional Parameter ◽  
Parameter Spaces ◽  
Simultaneous Perturbation Stochastic Approximation ◽  
Approximation Techniques ◽  
Constant Cost

The Quantum Fisher Information matrix (QFIM) is a central metric in promising algorithms, such as Quantum Natural Gradient Descent and Variational Quantum Imaginary Time Evolution. Computing the full QFIM for a model with d parameters, however, is computationally expensive and generally requires O(d2) function evaluations. To remedy these increasing costs in high-dimensional parameter spaces, we propose using simultaneous perturbation stochastic approximation techniques to approximate the QFIM at a constant cost. We present the resulting algorithm and successfully apply it to prepare Hamiltonian ground states and train Variational Quantum Boltzmann Machines.

scholarly journals Fisher Concord: Efficiency of Quantum Measurement

2016 ◽  
Vol 3 (1) ◽  
Author(s):  
Nan Li ◽  
Shunlong Luo
Keyword(s):  
Fisher Information ◽  
Fisher Information Matrix ◽  
Symmetric Matrix ◽  
Information Matrix ◽  
Quantum Fisher Information ◽  
Quantum Measurements ◽  
Quantum States ◽  
Information Theoretic ◽  
Information Conservation ◽  
Relative Accessibility

AbstractBy comparing measurement-induced classical Fisher information of parameterized quantum states with quantum Fisher information,we study the notion of Fisher concord (as abbreviation of the concord between the classical and the quantum Fisher information), which is an information-theoretic measure of quantum states and quantum measurements based on both classical and quantum Fisher information. Fisher concord is defined by multiplying the inverse square root of quantum Fisher information matrix to measurement-induced classical Fisher information matrix on both sides, and quantifies the relative accessibility of parameter information from quantum measurements (alternatively, the efficiency of quantum measurements in extracting parameter information). It reduces to the ratio of the classical Fisher information to quantum Fisher information in any single parameter scenario. In general, Fisher concord is a symmetric matrix which depends on both quantum states and quantum measurements. Some basic properties of Fisher concord are elucidated. The significance of Fisher concord in quantifying the interplay between classicality and quantumness in parameter estimation and in characterizing the ef- ficiency of quantum measurements are illustrated through several examples, and some information conservation relations in terms of Fisher concord are exhibited.

scholarly journals Quantum Fisher information matrix and multiparameter estimation

2019 ◽  
Vol 53 (2) ◽  
pp. 023001 ◽  
Author(s):  
Jing Liu ◽  
Haidong Yuan ◽  
Xiao-Ming Lu ◽  
Xiaoguang Wang
Keyword(s):  
Fisher Information ◽  
Fisher Information Matrix ◽  
Information Matrix ◽  
Quantum Fisher Information

Complexity Issues in Natural Gradient Descent Method for Training Multilayer Perceptrons

1998 ◽  
Vol 10 (8) ◽  
pp. 2137-2157 ◽  
Author(s):  
Howard Hua Yang ◽  
Shun-ichi Amari
Keyword(s):  
Fisher Information ◽  
Multilayer Perceptron ◽  
Gradient Descent ◽  
Fisher Information Matrix ◽  
Information Matrix ◽  
Descent Method ◽  
Multilayer Perceptrons ◽  
Gradient Descent Method ◽  
Natural Gradient ◽  
Hidden Neurons

The natural gradient descent method is applied to train an n-m-1 multilayer perceptron. Based on an efficient scheme to represent the Fisher information matrix for an n-m-1 stochastic multilayer perceptron, a new algorithm is proposed to calculate the natural gradient without inverting the Fisher information matrix explicitly. When the input dimension n is much larger than the number of hidden neurons m, the time complexity of computing the natural gradient is O(n).

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