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A Perturbative-Based Generalized Series Expansion in Terms of Non-Orthogonal Component Functions
A Perturbative-Based Generalized Series Expansion in Terms of Non-Orthogonal Component Functions
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摘要:
In this paper we present a generalized perturbative approximate series expansion in terms of non-orthogonal component functions. The expansion is based on a perturbative formulation where, in the non-orthogonal case, the contribution of a given component function, at each point, in the time domain or frequency in the Fourier domain, is assumed to be perturbed by contributions from the other component functions in the set. In the case of orthogonal basis functions, the formulation reduces to the non-perturbative case approximate series expansion. Application of the series expansion is demonstrated in the context of two non-orthogonal component function sets. The technique is applied to a series of non-orthogonalized Bessel functions of the first kind that are used to construct a compound function for which the coefficients are determined utilizing the proposed approach. In a second application, the technique is applied to an example associated with the inverse problem in electrophysiology and is demonstrated through decomposition of a compound evoked potential from a peripheral nerve trunk in terms of contributing evoked potentials from individual nerve fibers of varying diameter. An additional application of the perturbative approximation is illustrated in the context of a trigonometric Fourier series representation of a continuous time signal where the technique is used to compute an approximation of the Fourier series coefficients. From these examples, it will be demonstrated that in the case of non-orthogonal component functions, the technique performs significantly better than the generalized Fourier series which can yield nonsensical results.
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| 篇名 | A Perturbative-Based Generalized Series Expansion in Terms of Non-Orthogonal Component Functions | ||
| 来源期刊 | 应用数学(英文) | 学科 | 数学 |
| 关键词 | Non-Orthogonal FUNCTIONS SERIES EXPANSION APPROXIMATE SERIES EXPANSION Perturbative-Based APPROXIMATE EXPANSION Numerical Approximations | ||
| 年,卷(期) | 2017,(1) | 所属期刊栏目 | |
| 研究方向 | 页码范围 | 106-116 | |
| 页数 | 11页 | 分类号 | O1 |
| 字数 | 语种 | ||
| DOI | |||
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Non-Orthogonal
FUNCTIONS
SERIES
EXPANSION
APPROXIMATE
SERIES
EXPANSION
Perturbative-Based
APPROXIMATE
EXPANSION
Numerical
Approximations
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应用数学(英文)
主办单位:
美国科研出版社
出版周期:
月刊
ISSN:
2152-7385
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出版地:
武汉市江夏区汤逊湖北路38号光谷总部空间
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