A derivation of the generalized Korf growth equation and its application

Li Feng-ri; Zhao Bao-dong; Su Gui-lin

doi:10.1007/BF02856679

Journal of Forestry Research ›› 2000, Vol. 11 ›› Issue (2) : 81 -88. DOI: 10.1007/BF02856679

Article

A derivation of the generalized Korf growth equation and its application

Author information +

History +

PDF

Abstract

Based on the biological hypothesis of tree growth, the generalized Korf growth equation, was derived theoretically. From a standpoint of applications, the equation can be used in two ways associated with the power exponent ofp, and two types of growth equations: the Korf-A (p>1) and the Korf-B (O<p<1) were developed and between them, there is the Gompertz equation (p=1) to separate each other. All of the three types of equations are independent. It was concluded that the Korf-A equation could be used to describe the growth of trees, of which inflection point is between 0 andA/e, while the Korf-B equation with the inflection point betweenA/e andA could be applied to describe the biological population growth. It was found that the Korf-A equation had a better property in describing the growth process of a tree or a stand and its applications to predicting height growth and stand self-thinning showed general good fitness.

Keywords

Korf equation / Growth model / Self-thinning / Model fitting / S71 / A

Cite this article

Download citation ▾

Li Feng-ri, Zhao Bao-dong, Su Gui-lin. A derivation of the generalized Korf growth equation and its application. Journal of Forestry Research, 2000, 11(2): 81-88 DOI:10.1007/BF02856679

登录浏览全文

4963

注册一个新账户忘记密码

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]	Brewer J.A., Burns P.Y., Cao Q.V. Short-term projection accuracy of five asymptotic height-age curves for toblolly pine [J]. For. Sci., 1985, 31: 414-418.

[2]	Fengri Li Study on diameter distribution and yields models for natural dahurian larch stands [J]. J. Northeast For. Univ., 1987, 15(4): 8-16. (In Chinese)

[3]	Li Fengri, 1995. A simulation system of stand dynamics for larch plantation [D]. Ph.D. dissertation. Beijing Forestry Univ., p203 (In Chinese).

[4]	Fengri Li, Lingbin Meng Maximum density line and model of self-thinning for plantation [J]. J. Northeast Forestry University (English Edition), 1995, 6(4): 1-7.

[5]	Lundqvist B. On the height growth in cultivated stands of pine and spruce in Northern Sweden [J]. Medd. Fran Statens Skogforsk., band, 1957, 47(2): 64-64.

[6]	Minowa M. A theoretical approach to forest growth model (I) The log-Mitscherlich theory [J]. J. Jap. For. Soc., 1982, 64(12): 461-467. (In Japanese)

[7]	Osumi S., Ishikawa Y. Applicability of the Richards’ growth function to analysis of growth of tree [J]. Scientific Reports of the Kyoto Prefecture Univ. Agriculture, 1983, 35: 49-76. (In Japanese)

[8]	Pienaar L.V., Turnbull K.J. The Chapman-Richards generalization of Von Bertalanffy’s growth model for basal area growth and yield in even-aged stand [J]. For. Sci., 1973, 19(1): 2-22.

[9]	Chapman-Richards F.J. A flexible growth function for empirical use [J]. J. Exp. Bot., 1959, 10: 290-300.

[10]	Smith N.J., Hann D.W. A growth model based on the self-thinning rule [J]. Can. J. For. Res., 1984, 16: 330-334.

[11]	Stage A.R. A mathematical approach to polymorphic site index curves for grand fir [J]. For. Sci., 1963, 9(2): 167-180.

[12]	StatSoft, Inc. 1995. STATISTICA for Windows [C] [Computer program manual]. Tulsa. OK.

[13]	Tang S.Z., Meng C.H., Meng F.R. et al. A growth and self-thinning model for pure even-aged stands: theory and application [J]. For. Ecol. Manage, 1994, 70: 67-73.

[14]	Yang Y.C. Studies on the relationship of structure, allometric growth of tree and self-thinning rule based on the principles of plant ecology [J]. Q. J. Exp. Forest. National Taiwan University, 1989, 4(1): 147-163. (in Chinese)

[15]	Yoda K., Kira T., Ogawa H. et al. Self-thinning in overcrowed pure stands under cultivated and natural conditions [J]. J. Biol. Osaka City Univ., 1963, 14: 107-109.