论文信息 - On Stability of Linear Estimators in Poisson Noise

On Stability of Linear Estimators in Poisson Noise

This paper considers estimation of a random variable in Poisson noise. Specifically, the main focus is to assess optimality and near optimality conditions for linear estimators.In the first part of the paper, it is shown that linear estimators are optimal if and only if the underlying prior is a gamma distribution and the dark current parameter is zero.In the second part of the paper, a stability analysis of linear estimators is undertaken. Specifically, it is shown that if an optimal estimator is close to a linear estimator in an Lp,p ≥1 distance, then the underlying prior distribution is approximately gamma in the Lévy metric and the Kolmogorov metric.

Alex Dytso | H. Vincent Poor | H. Poor | Alex Dytso

[1] Alex Dytso,et al. Estimation in Poisson Noise: Properties of the Conditional Mean Estimator , 2020, IEEE Transactions on Information Theory.

[2] H. Bohman,et al. Approximate fourier analysis of distribution functions , 1961 .

[3] S. Shamai,et al. Capacity of a pulse amplitude modulated direct detection photon channel , 1990 .

[4] John R. Pierce,et al. The capacity of the photon counting channel , 1981, IEEE Trans. Inf. Theory.

[5] Xin Guo,et al. On the optimality of conditional expectation as a Bregman predictor , 2005, IEEE Trans. Inf. Theory.

[6] Yihong Wu,et al. Strong Data Processing Inequalities for Input Constrained Additive Noise Channels , 2015, IEEE Transactions on Information Theory.

[7] Dudley,et al. Real Analysis and Probability: Measurability: Borel Isomorphism and Analytic Sets , 2002 .

[8] J. Gordon,et al. Quantum Effects in Communications Systems , 1962, Proceedings of the IRE.

[9] Sergey G. Bobkov,et al. Proximity of probability distributions in terms of Fourier–Stieltjes transforms , 2016 .

[10] S. Verdú. Poisson Communication Theory , 2004 .

[11] P. Diaconis,et al. Conjugate Priors for Exponential Families , 1979 .