The evaluation of trigonometric integrals avoiding spurious discontinuities

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The evaluation of trigonometric integrals avoiding spurious discontinuities

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 20 , Issue 1 (March 1994) table of contents

Pages: 124 - 135

Year of Publication: 1994

ISSN:0098-3500

Authors

D. J. Jeffrey	The Univ. of Western Ontario, London, Ont., Canada
A. D. Rich	Soft Warehouse Inc., Honolulu, HI

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 6, Downloads (12 Months): 27, Citation Count: 2

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ABSTRACT

The tan(x/2) substitution, also called the Weierstrass substitution, is one method currently used by computer-algebra systems for the evaluation of trigonometric integrals. The method needs to be improved, because the expressions obtained using it sometimes contain discontinuities, which unnecessarily limit the domains over which the expressions are correct. We show that the discontinuities are spurious in the following sense: Given an integrand and an expression for its antiderivative that was obtained by the Weierstrass substition, a better expression can be found that is continuous on wider intervals than the first expression and yet is still an antiderivative of the integrand. The origin of the discontinuities is identified, and an algorithm is presented for automatically finding the improved type of antiderivative. The new algorithm also enlarges the set of functions that can be used in the substitution. The algorithm works by first evaluating the given integral using the Weierstrass substitution in the usual way and then removing any spurious discontinuities present in the antiderivative.

REFERENCES

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	1	ADAMS, R.A. 1990. Single Variable Calculus. Addison-Wesley, Reading, Mass.
	2	BURKmL, J.C. 1962. A First Course in Mathematical Analysis. Cambridge University Press, New York.
	3	Keith O. Geddes , Stephen R. Czapor , George Labahn, Algorithms for computer algebra, Kluwer Academic Publishers, Norwell, MA, 1992
	4	G~SHTEYN, I. S., AND RYZHIK, I.M. 1979. Table of Integrals, Series and Products. Academic Press, New York.
	5	GREENSPAN, H. P., BENNEY, D. J. AND TURNER, J. E. 1986. Calculus: An Introduction to Applied Mathematics. McGraw-Hill, New York.
	6	RICH, A. D., AND STOUTEMYER, D.R. 1988. Derive user manual. Soft Warehouse Inc., Honolulu, Hawaii.
	7	RUDIN, W. 1976. Principles of Mathematical Analysis. 3rd ed. McGraw Hill, New York.
	8	STEWART, J. 1989. Single Variable Calculus. Brookes/Cole, Monterey, Calif.
	9	THOMAS, G. B., AND FINNEY, R.L. 1984. Calculus and Analytical Geometry. Addison-Wesley, Reading, Mass.

CITED BY 2

	D. J. Jeffrey , A. D. Rich, Recursive integration of piecewise-continuous functions, Proceedings of the 1998 international symposium on Symbolic and algebraic computation, p.290-294, August 13-15, 1998, Rostock, Germany
	D. J. Jeffrey, Integration to obtain expressions valid on domains of maximum extent, Proceedings of the 1993 international symposium on Symbolic and algebraic computation, p.34-41, July 06-08, 1993, Kiev, Ukraine