Univariate power series expansions in REDUCE

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Univariate power series expansions in REDUCE

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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: 82 - 87

Year of Publication: 1990

ISBN:0-201-54892-5

Authors

J. Padget	School of Mathematical Sciences, University of Bath, Claverton Down, Bath BA2 7AY, United Kingdom
A. Barnes	Department of Computer Science and Applied Mathematics, Aston University, Birmingham B4 7ET, United Kingdom

Sponsor

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation

Publisher

ACM New York, NY, USA

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ABSTRACT

We describe the development of a formal power series expansion package for Reduce which takes advantage of Reduce's domain mechanism to make for a seamless integration of series values with the rest of the Reduce system. Consequently, series values may be manipulated with the same algebraic operators as other algebraic objects. To create the illusion of infinite power series a simulated lazy-evaluation mechanism has been used. This paper reports our experience of using the Reduce domain mechanism and documents the algorithms and data structures that can be used to implement and to represent power series.

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.

	Bradford et al, 1986	R. J. Bradford , A. C. Hearn , J. A. Padget , E. Schrüfer, Enlarging the REDUCE domain of computation, Proceedings of the fifth ACM symposium on Symbolic and algebraic computation, p.100-106, July 21-23, 1986, Waterloo, Ontario, Canada [doi>10.1145/32439.32460]
	Comtet, 1974	Comtet L., Advanced Combinaiorics. The Art of Finite and Infinite Expansions, pp137- 8, D. Reidel Publishing Co., Dordrecht, 1974.
	Feldmar & Kölbig, 1986	Feldmar E & KSlbig K.S., Reduce Procedures for the Manipulation of Generalised Power Series, Computer Physics Communications, Vol 39, 267-284 (1986).
	Fitch, 1974	John Fitch, Problem #8: random walk, ACM SIGSAM Bulletin, v.8 n.4, p.11-11, November 1974 [doi>10.1145/1088288.1088289]
	Harrington, 1978	Harrington S., A Generalized Power Series Mechanism for Reduce, University of Utah Symbolic Computation Group Technical Reports, UCP-62 & UCP-65, 1978.
	Henrici, 1974	Henrici P, Applied and Complex Computational Analysis, Vol 1. Wiley, 1974 (second edition, 1988).
	Knuth, 1981	Donald E. Knuth, The art of computer programming, volume 2 (3rd ed.): seminumerical algorithms, Addison-Wesley Longman Publishing Co., Inc., Boston, MA, 1997
	Matula & Kornerup, 1985	Matula D.W. & Kornerup P., Finite Precision Rational A rilhmetic: Slash Number Systems, IEEE Transactions on Computers C-34, Vol. 1, No. 1, pp3-18, January 1985.
	Norman, 1975	A. C. Norman, Computing with Formal Power Series, ACM Transactions on Mathematical Software (TOMS), v.1 n.4, p.346-356, Dec. 1975 [doi>10.1145/355656.355660]
	Norman, 1975a	A. C. Norman, Solutions to problem 8, ACM SIGSAM Bulletin, v.9 n.1, p.7-9, February 1975 [doi>10.1145/1088295.1088296]
	Silver & Sullivan, 1974	Silver A. & Sullivan E., The numerical solution of ordinary differential equations by the Taylor series method, Goddard Space Flight Center, Greenbelt Md., Doe. X-641-73-202, 1974.
	Zippel, 1975	Richard Zippel, A MACSYMA solution to problem 8, ACM SIGSAM Bulletin, v.9 n.1, p.10-12, February 1975 [doi>10.1145/1088295.1088297]
	Zippel, 1976	Richard E. Zippel, Univariate power series expansions in algebraic manipulation, Proceedings of the third ACM symposium on Symbolic and algebraic computation, p.198-208, August 10-12, 1976, Yorktown Heights, New York, United States [doi>10.1145/800205.806335]
	Zyczkowski, 1965	Zyczkowski M., Operalions on Generalized Power Series, Zeitschrift fiir Angewandte Mathematik und Mechanik, Vo145, 235-244 (1965).