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Main Authors: Shen, Shui-Fa, Qian, Wei-Liang, Zhang, Jie, Pan, Yu, Yan, Yu-Peng, Shao, Cheng-Gang
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2404.18288
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author Shen, Shui-Fa
Qian, Wei-Liang
Zhang, Jie
Pan, Yu
Yan, Yu-Peng
Shao, Cheng-Gang
author_facet Shen, Shui-Fa
Qian, Wei-Liang
Zhang, Jie
Pan, Yu
Yan, Yu-Peng
Shao, Cheng-Gang
contents Higher-degree polynomial interpolations carried out on uniformly distributed nodes are often plagued by {\it overfitting}, known as Runge's phenomenon. This work investigates Runge's phenomenon and its suppression in various versions of the matrix method for black hole quasinormal modes. It is shown that an appropriate choice of boundary conditions gives rise to desirable suppression of oscillations associated with the increasing Lebesgue constant. For the case of discontinuous effective potentials, where the application of the above boundary condition is not feasible, the recently proposed scheme with delimited expansion domain also leads to satisfactory results. The onset of Runge's phenomenon and its effective suppression are demonstrated by evaluating the relevant waveforms. Furthermore, we argue that both scenarios are either closely related to or practical imitations of the Chebyshev grid. The implications of the present study are also addressed.
format Preprint
id arxiv_https___arxiv_org_abs_2404_18288
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Matrix method and the suppression of Runge's phenomenon
Shen, Shui-Fa
Qian, Wei-Liang
Zhang, Jie
Pan, Yu
Yan, Yu-Peng
Shao, Cheng-Gang
General Relativity and Quantum Cosmology
Higher-degree polynomial interpolations carried out on uniformly distributed nodes are often plagued by {\it overfitting}, known as Runge's phenomenon. This work investigates Runge's phenomenon and its suppression in various versions of the matrix method for black hole quasinormal modes. It is shown that an appropriate choice of boundary conditions gives rise to desirable suppression of oscillations associated with the increasing Lebesgue constant. For the case of discontinuous effective potentials, where the application of the above boundary condition is not feasible, the recently proposed scheme with delimited expansion domain also leads to satisfactory results. The onset of Runge's phenomenon and its effective suppression are demonstrated by evaluating the relevant waveforms. Furthermore, we argue that both scenarios are either closely related to or practical imitations of the Chebyshev grid. The implications of the present study are also addressed.
title Matrix method and the suppression of Runge's phenomenon
topic General Relativity and Quantum Cosmology
url https://arxiv.org/abs/2404.18288