Better simplification of elementary functions through power series

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Better simplification of elementary functions through power series

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International Conference on Symbolic and Algebraic Computation archive
Proceedings of the 2003 international symposium on Symbolic and algebraic computation table of contents

Philadelphia, PA, USA

Pages: 30 - 36

Year of Publication: 2003

ISBN:1-58113-641-2

Authors

James Beaumont	University of Bath, Bath, England
Russell Bradford	University of Bath, Bath, England
James H. Davenport	University of Bath, Bath, England

Sponsors

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation
ACM: Association for Computing Machinery

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ACM New York, NY, USA

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Downloads (6 Weeks): 3, Downloads (12 Months): 15, Citation Count: 4

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ABSTRACT

In [5], we introduced an algorithm for deciding whether a proposed simplification of elementary functions was correct in the presence of branch cuts. This algorithm used multivalued function simplification followed by verification that the branches were consistent.In [14] an algorithm was presented for zero-testing functions defined by ordinary differential equations, in terms of their power series.The purpose of the current paper is to investigate merging the two techniques. In particular, we will show an explicit reduction to the constant problem [16].

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 4

	Jacques Carette, Understanding expression simplification, Proceedings of the 2004 international symposium on Symbolic and algebraic computation, p.72-79, July 04-07, 2004, Santander, Spain
	James C. Beaumont , Russell J. Bradford , James H. Davenport , Nalina Phisanbut, A poly-algorithmic approach to simplifying elementary functions, Proceedings of the 2004 international symposium on Symbolic and algebraic computation, p.27-34, July 04-07, 2004, Santander, Spain
	D. J. Jeffrey , A. C. Norman, Not seeing the roots for the branches: multivalued functions in computer algebra, ACM SIGSAM Bulletin, v.38 n.3, September 2004
	James C. Beaumont , Russell J. Bradford , James H. Davenport , Nalina Phisanbut, Adherence is better than adjacency: computing the Riemann index using CAD, Proceedings of the 2005 international symposium on Symbolic and algebraic computation, p.37-44, July 24-27, 2005, Beijing, China