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Scandinavian Journal of Forest Research Volume 5, 1990 - Issue 1-4
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Original Articles

The monotony preserving QO‐spline as a taper curve

Aatos Lahtinen Department of Mathematics, University of Helsinki , Hallituskatu 15, Helsinki, SF‐00100, Finland
&
Kaija Laurila Department of Mathematics, University of Helsinki , Hallituskatu 15, Helsinki, SF‐00100, Finland
Pages 277-283 | Published online: 10 Dec 2008

References

  • De Boor, C. , 1978. A practical guide to splines. . New York, Heidelberg, Berlin: Springer‐Verlag; 1978. p. 392.
  • Laasasenaho, J. , 1982. Taper curve and volume functions for pine, spruce and birch , Commun. Inst. For. Fenn. 108 (1982), pp. 1–74.
  • Lahtinen, A. , 1988a. Shape preserving interpolation by quadratic splines . Reports of Department of Mathematics, University of Helsinki; 1988a. pp. 1–12.
  • Lahtinen, A. , 1988b. On the construction of monotony preserving taper curves , Acta For. Fenn. 203 (1988b), pp. 1–34.
  • Lahtinen, A. , and Laasasenaho, J. , 1979. On the construction of taper curves by using spline functions , Commun. Inst. For. Fenn. 95 ((8)) (1979), pp. 1–63.
  • Lorentz, G. , 1953. Bernstein polynomials. . Toronto: Univ. of Toronto Press; 1953. p. 130.
  • McAllister, D. , and Roulier, J. , 1978. Interpolation by convex quadratic splines , Math. Comp. 32 (1978), pp. 1154–1162.
  • McAllister, D. , and Roulier, J. , 1981a. An algorithm for computing a shape‐preserving osculatory quadratic spline , ACM Trans. Math. Software 7 (1981a), pp. 331–347.
  • McAllister, D. , and Roulier, J. , 1981b. Algorithm 574. Shape‐preserving osculatory quadratic splines , ACM Trans. Math. Software 7 (1981b), pp. 384–386.
  • Schumaker, L. , 1983. On shape preserving quadratic spline interpolation , SIAM. J. Numer. Anal. 20 (1983), pp. 854–864.

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