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AUTHOR(S):

Derya Bodur, Metin Demiralp

 

TITLE

Separate Node Ascending Derivatives Expansion (SNADE) as a Univariate Function Representation

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ABSTRACT

This work focuses on the novel approach which is named as “Seperate Node Ascending Derivatives (SNADE)”. SNADE is a very recently developed univariate function representation. This method has a similar structure to the Taylor series expansion. Two specific cases related recurrent nodes with reference to certain rules are handled in this paper.

KEYWORDS

SNADE, Integral Operator, Taylor Series, Multinode Expansion, Cauchy Contour Integral

REFERENCES

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[2] N.A. Baykara, and M. Demiralp, Separate Node Ascending Derivatives Expansion (SNADE) for Univariate Functions: Polynomial Recursions, Remainder Bounds and the Convergence AIP Proceedings for the International Conference of Numerical Analysis and Applied Mathematics (ICNAAM 2014), 22-28 September 2014, Rhodes, Greece, 2014, Vol 1, pp. 407-414. 

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Cite this paper

Derya Bodur, Metin Demiralp. (2016) Separate Node Ascending Derivatives Expansion (SNADE) as a Univariate Function Representation. International Journal of Mathematical and Computational Methods, 1, 195-200

 

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