TL;DR
This paper demonstrates that the ill-posedness in reconstructing spectral functions from Euclidean correlators is fundamental, and explores how neural networks can provide regularized solutions with reliable reconstruction of dominant spectral components.
Contribution
The paper analytically proves the fundamental nature of the ill-posedness and shows how neural network-based regularization can improve spectral function reconstruction.
Findings
Eigenvalue analysis reveals the fundamental ill-posedness.
Neural network regularization improves reconstruction of dominant spectral components.
Different regularization schemes yield consistent results for large eigenvalues.
Abstract
Reconstructing hadron spectral functions through Euclidean correlation functions are of the important missions in lattice QCD calculations. However, in a K\"allen--Lehmann(KL) spectral representation, the reconstruction is observed to be ill-posed in practice. It is usually ascribed to the fewer observation points compared to the number of points in the spectral function. In this paper, by solving the eigenvalue problem of continuous KL convolution, we show analytically that the ill-posedness of the inversion is fundamental and it exists even for continuous correlation functions. We discussed how to introduce regulators to alleviate the predicament, in which include the Artificial Neural Networks(ANNs) representations recently proposed by the Authors in~[Phys. Rev. D 106 (2022) L051502]. The uniqueness of solutions using ANNs representations is manifested analytically and validated…
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