Series solutions of algebraic and differential equations: a comparison of linear and quadratic algebraic convergence

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Series solutions of algebraic and differential equations: a comparison of linear and quadratic algebraic convergence

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International Conference on Symbolic and Algebraic Computation archive
Proceedings of the ACM-SIGSAM 1989 international symposium on Symbolic and algebraic computation table of contents

Portland, Oregon, United States

Pages: 11 - 16

Year of Publication: 1989

ISBN:0-89791-325-6

Author

R. J. Fateman

University of California, Berkeley

Sponsor

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation

Publisher

ACM New York, NY, USA

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ABSTRACT

Speed of convergence of Newton-like iterations in an algebraic domain can be affected heavily by the increasing cost of each step, so much so that a quadratically convergent algorithm with complex steps may be comparable to a slower one with simple steps. This note gives two examples: solving algebraic and first-order ordinary differential equations using the MACSYMA algebraic manipulation system, demonstrating this phenomenon. The relevant programs are exhibited in the hope that they might give rise to more widespread application of these techniques.

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.

	1	M. Anderson. An implementation of the Newton polygon procedure, Term Project for CS 292s, Winter, 1980 (University of California, Berkeley), 1980.
	2	Jean Della Dora , Giovanni Di Crescenzo , Evelyne Tournier, An Algorithm to Obtain Formal Solutions of a Linear Homogeneous Differential Equation at an Irregular Singular Point, Proceedings of the European Computer Algebra Conference on Computer Algebra, p.273-280, April 05-07, 1982
	3	W. G. Dubuque. Series Solution of Functional Equations:Taylor-solve, MACSYMA Newsletter 3 no. 3 July, 1986, 18-19.
	4	R. Fateman. Some comments on series solutions, Proc. 1977 Macsyma Users' Conf., NASA CP- 2012 (July 1977) 43-52.
	5	Keith O. Geddes, Convergence behavior of the Newton iteration for first order differential equations, Proceedings of the International Symposiumon on Symbolic and Algebraic Computation, p.189-199, June 01, 1979
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	8	Y-M Shen. SOODESIS, Term Project for CS 292s, Winter, 1980 (University of California, Berkeley) 20 pp.
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