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Main Authors: Ling, Yu-Fei, Chu, Min-Huan, Liang, Jian, Hua, Jun, Xiong, Ao-Sheng, Zhang, Qi-An
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.03593
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author Ling, Yu-Fei
Chu, Min-Huan
Liang, Jian
Hua, Jun
Xiong, Ao-Sheng
Zhang, Qi-An
author_facet Ling, Yu-Fei
Chu, Min-Huan
Liang, Jian
Hua, Jun
Xiong, Ao-Sheng
Zhang, Qi-An
contents We investigate several approaches to address the inverse problem that arises in the limited inverse Fourier transform (L-IDFT) of quasi-distributions. The methods explored include Tikhonov regularization, the Backus-Gilbert method, the Bayesian approach with Gaussian Random Walk (GRW) prior, and the feedforward artificial neural networks (ANNs). We evaluate the performance of these methods using both mock data generated from toy models and real lattice data from quasi distribution, and further compare them with the physics-driven $λ$-extrapolation approach. Our results demonstrate that the L-IDFT constitutes a moderately tractable inverse problem Except for the Backus-Gilbert method, all the other approaches are capable of correctly reconstructing the quasi-distributions in momentum space. In particular, the Bayesian approach with GRW and the feedforward ANNs yield more stable and accurate reconstructions. Based on these investigations, we conclude that, for a given L-IDFT problem, selecting an appropriate reconstruction method according to the input data and carefully assessing the potential systematic uncertainties are essential for obtaining reliable results.
format Preprint
id arxiv_https___arxiv_org_abs_2511_03593
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Approaches to the Inverse Fourier Transformation with Limited and Discrete Data
Ling, Yu-Fei
Chu, Min-Huan
Liang, Jian
Hua, Jun
Xiong, Ao-Sheng
Zhang, Qi-An
High Energy Physics - Lattice
We investigate several approaches to address the inverse problem that arises in the limited inverse Fourier transform (L-IDFT) of quasi-distributions. The methods explored include Tikhonov regularization, the Backus-Gilbert method, the Bayesian approach with Gaussian Random Walk (GRW) prior, and the feedforward artificial neural networks (ANNs). We evaluate the performance of these methods using both mock data generated from toy models and real lattice data from quasi distribution, and further compare them with the physics-driven $λ$-extrapolation approach. Our results demonstrate that the L-IDFT constitutes a moderately tractable inverse problem Except for the Backus-Gilbert method, all the other approaches are capable of correctly reconstructing the quasi-distributions in momentum space. In particular, the Bayesian approach with GRW and the feedforward ANNs yield more stable and accurate reconstructions. Based on these investigations, we conclude that, for a given L-IDFT problem, selecting an appropriate reconstruction method according to the input data and carefully assessing the potential systematic uncertainties are essential for obtaining reliable results.
title Approaches to the Inverse Fourier Transformation with Limited and Discrete Data
topic High Energy Physics - Lattice
url https://arxiv.org/abs/2511.03593