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Main Authors: Pan, Hao-Xiang, Kong, De-Kai, Wen, Qiao-Yi, Jiang, Shao-Zhou
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2311.10423
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author Pan, Hao-Xiang
Kong, De-Kai
Wen, Qiao-Yi
Jiang, Shao-Zhou
author_facet Pan, Hao-Xiang
Kong, De-Kai
Wen, Qiao-Yi
Jiang, Shao-Zhou
contents The values of the low-energy constants (LECs) are very important in the chiral perturbation theory. This paper adopts a Bayesian method with the truncation errors to globally fit eight next-to-leading order (NLO) LECs $L_i^r$ and next-to-next-leading order (NNLO) LECs $C_i^r$. With the estimation of the truncation errors, the fitting results of $L_i^r$ in the NLO and NNLO are very close. The posterior distributions of $C_i^r$ indicate the boundary-dependent relations of these $C_i^r$. Ten $C_i^r$ are weakly dependent on the boundaries and their values are reliable. The other $C_i^r$ are required more experimental data to constrain their boundaries. Some linear combinations of $C_i^r$ are also fitted with more reliable posterior distributions. If one knows some more precise values of $C_i^r$, some other $C_i^r$ can be obtained by these values. With these fitting LECs, most observables provide a good convergence, except for the $πK$ scattering lengths $a_0^{3/2}$ and $a_0^{1/2}$. An example is also introduced to test the improvement of the method. All the computations indicate that considering the truncation errors can improve the global fit greatly, and more prior information can obtain better fitting results. This fitting method can be extended to the other effective field theories and the perturbation theory.
format Preprint
id arxiv_https___arxiv_org_abs_2311_10423
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Bayesian method for fitting the low-energy constants in chiral perturbation theory
Pan, Hao-Xiang
Kong, De-Kai
Wen, Qiao-Yi
Jiang, Shao-Zhou
High Energy Physics - Phenomenology
The values of the low-energy constants (LECs) are very important in the chiral perturbation theory. This paper adopts a Bayesian method with the truncation errors to globally fit eight next-to-leading order (NLO) LECs $L_i^r$ and next-to-next-leading order (NNLO) LECs $C_i^r$. With the estimation of the truncation errors, the fitting results of $L_i^r$ in the NLO and NNLO are very close. The posterior distributions of $C_i^r$ indicate the boundary-dependent relations of these $C_i^r$. Ten $C_i^r$ are weakly dependent on the boundaries and their values are reliable. The other $C_i^r$ are required more experimental data to constrain their boundaries. Some linear combinations of $C_i^r$ are also fitted with more reliable posterior distributions. If one knows some more precise values of $C_i^r$, some other $C_i^r$ can be obtained by these values. With these fitting LECs, most observables provide a good convergence, except for the $πK$ scattering lengths $a_0^{3/2}$ and $a_0^{1/2}$. An example is also introduced to test the improvement of the method. All the computations indicate that considering the truncation errors can improve the global fit greatly, and more prior information can obtain better fitting results. This fitting method can be extended to the other effective field theories and the perturbation theory.
title Bayesian method for fitting the low-energy constants in chiral perturbation theory
topic High Energy Physics - Phenomenology
url https://arxiv.org/abs/2311.10423