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Main Authors: Singh, Abhishek Kumar, Mehra, Mani, Alikhanov, Anatoly A.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2405.00382
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author Singh, Abhishek Kumar
Mehra, Mani
Alikhanov, Anatoly A.
author_facet Singh, Abhishek Kumar
Mehra, Mani
Alikhanov, Anatoly A.
contents The least squares method provides the best-fit curve by minimizing the total squares error. In this work, we provide the modified least squares method based on the fractional orthogonal polynomials that belong to the space $M_{n}^λ := \text{span}\{1,x^λ,x^{2λ},\ldots,x^{nλ}\},~λ\in (0,2]$. Numerical experiments demonstrate how to solve different problems using the modified least squares method. Moreover, the results show the advantage of the modified least squares method compared to the classical least squares method. Furthermore, we discuss the various applications of the modified least squares method in the fields like fractional differential/integral equations and machine learning.
format Preprint
id arxiv_https___arxiv_org_abs_2405_00382
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Modified least squares method and a review of its applications in machine learning and fractional differential/integral equations
Singh, Abhishek Kumar
Mehra, Mani
Alikhanov, Anatoly A.
Numerical Analysis
The least squares method provides the best-fit curve by minimizing the total squares error. In this work, we provide the modified least squares method based on the fractional orthogonal polynomials that belong to the space $M_{n}^λ := \text{span}\{1,x^λ,x^{2λ},\ldots,x^{nλ}\},~λ\in (0,2]$. Numerical experiments demonstrate how to solve different problems using the modified least squares method. Moreover, the results show the advantage of the modified least squares method compared to the classical least squares method. Furthermore, we discuss the various applications of the modified least squares method in the fields like fractional differential/integral equations and machine learning.
title Modified least squares method and a review of its applications in machine learning and fractional differential/integral equations
topic Numerical Analysis
url https://arxiv.org/abs/2405.00382