Algorithm 507: Procedures for Quintic Natural Spline Interpolation [E1]

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Algorithm 507: Procedures for Quintic Natural Spline Interpolation [E1]

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 2 , Issue 3 (September 1976) table of contents

Pages: 281 - 289

Year of Publication: 1976

ISSN:0098-3500

Authors

John G. Herriot	Department of Computer Science, Stanford University, Stanford, CA
Christian H. Reinsch	Leibniz-Rechenzentrum der Bayerischen Akademie der Wissenschaften, 8 Munehen 2, Germany

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 10, Downloads (12 Months): 117, Citation Count: 1

Additional Information:

appendices and supplements references cited by index terms collaborative colleagues

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APPENDICES and SUPPLEMENTS

QUINAT (507.gz) (3 KB)

interpolating quintic natural spline
Gams: E1a

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	ANSELONE, P.M., AND LAURENT, P.J. A general method for the construction of interpolating and smoothing spline functions Numer. Math 1~ (1968), 66-82.
	2	CURRY, H.B., AND SCHOENBERG, I.J. On PSlya frequency functions. IV. The fundamental spline functions and their limits. J. Anal. Math 17 (1966), 71-107.
	3	GREVILLE, T.N.E. Introduction to spline functions. In Theory and Applications of Spline Functwns, T.N.E. Greville, Ed. Academic Press, New York, 1969, pp. 1-35.
	4	GREWLLE, T.N.E. Spline functions, interpolation and numerical quadrature. In Mathematical Methods for Digital Computers, vol.//, A. Ralston and H.S. Wilf, Eds. Wiley, New York, 1967.
	5	HERRIOT, J.G., AND REINSCH, C.H. Algol 60 procedures for the calculation of interpolating natural quintic spline functions. Tech. Rep. STAN-CS-74-402, Dep. Computer Science, Stanford Univ, Stanford, Calif., 1974.
	6	John G. Herriot , Christian H. Reinsch, Algorithm 472: procedures for natural spline interpolation [E1], Communications of the ACM, v.16 n.12, p.763-768, Dec. 1973 [doi>10.1145/362552.362558]
	7	SCHOENBERG, I.J. On interpolation by spline functions and its minimal properties. In On Approx,mation Theory. Proceedings of the Conference at Oberwolfach, 1963, P.L. Butzer and J. Korevaar, Eds Birkhafiser Verlag, Basel, Switzerland, 1964, pp 109-129.
	8	SP_kT~, H. Algorithm 42, Interpolation by certain quintic splmes. Comp~ter J. 12 (1969), 292-293.