Gröbner basis, integration and transcendental functions

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Gröbner basis, integration and transcendental functions

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International Conference on Symbolic and Algebraic Computation archive
Proceedings of the international symposium on Symbolic and algebraic computation table of contents

Tokyo, Japan

Pages: 152 - 156

Year of Publication: 1990

ISBN:0-201-54892-5

Author

N. Takayama

Department of Mathematics, Kobe University, Rokko, Kobe, 657, Japan

Sponsor

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 6, Downloads (12 Months): 31, Citation Count: 2

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ABSTRACT

It is well known that Gröbner basis is a fundamental and powerful tool to solve problems of polynomials ([Buch*],[JSC] etc). Recently, it is revealed that we can use Gröbner basis of Weyl algebra to solve the problems of integrations and formula verifications of transcendental functions ([Zei*], [Tak*], [AZ], [WZ*]). The purpose of the paper is to survey the theory of Gröbner basis of the ring of differential operators and its applications to the following problems: Computation of differential equations for a definite integral with parameters. Zero recognition of an expression that contains special functions or binomial coefficients etc., i.e. formula verification by a computer. Derivations of some of special functions identities. Solving a definite integral or obtaining an asymptotic expansion of a definite integral with parameters.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

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CITED BY 2

	N. Takayama, An algorithm of constructing the integral of a module--an infinite dimensional analog of Gröbner basis, Proceedings of the international symposium on Symbolic and algebraic computation, p.206-211, August 20-24, 1990, Tokyo, Japan
	Xiao-Shan Gao , Yong Luo , Chunming Yuan, A characteristic set method for ordinary difference polynomial systems, Journal of Symbolic Computation, v.44 n.3, p.242-260, March, 2009