The generalized Chapman-Richards function and applications to tree and stand growth

Liu Zhao-gang; Li Feng-ri

doi:10.1007/BF02856757

Journal of Forestry Research ›› 2003, Vol. 14 ›› Issue (1) :19 -26. DOI: 10.1007/BF02856757

Article

The generalized Chapman-Richards function and applications to tree and stand growth

Liu Zhao-gang ¹
, Li Feng-ri ¹

Author information +

History +

PDF

Abstract

The generalized Chapman-Richards model was derived from the Chapman-Richards function in which parameters η,k andm were unconstrained. Based on the structure of solutions and biological interpretations, the model could be classified into eight cases (three categories) at all and among them only 4 kinds of cases are suitable in forestry that represent four typical growth patterns of trees and stands. For each of 4 equations, the model properties and biological interpretations for parameters were discussed in detail. The generalized Chapman-Richards model was capable of describing a wide range of growth curves that was asymptotic or nonasymptotic, with or without inflection point. In order to illustrate the versatility, of the model, it was fitted to a group of data sets concerning the DBH growth of cryptomeria plantations with 4 initial densities and the DBH and height growth of natural Korean pinetree. Comparing the generalized Chapman-Richards function and the Schnute model, it was found that the parameters and expressions of the two models were interchangeable in theory, and the fitting results were explicitly identical in empirical applications.

Keywords

Generalized Chapman-Richards function / Schnute model / Growth model / Growth pattern / Cryptomeria japonica / Pinus koraiensis / S711 / A

Cite this article

Download citation ▾

Liu Zhao-gang, Li Feng-ri. The generalized Chapman-Richards function and applications to tree and stand growth. Journal of Forestry Research, 2003, 14(1): 19-26 DOI:10.1007/BF02856757

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]	Von Bertalanffey L. Quantitative laws in metabolism and growth [J]. Quart. Rev. Biol., 1957, 32: 217-231.

[2]	Bredenkamp B.V., Gregoire I. G. A forestry application of the Schnute’s generalized growth function For. Sci., 1988, 34(3): 790-797.

[3]	Cooper C.F. Equations for the description of past growth in even-aged stand of ponderosa pine For. Sci., 1961, 7(1): 72-79.

[4]	Feng F.-L. Modelling stand growth varies in response to different spacing [J]. Quarterly. J. Exp. For. Nat. Taiwan Univ., 1997, 11(2): 111-123.

[5]	Ito T., Osumi S. An analysis of the basal area growth in even-aged pure stands based on the Richards growth function [J]. J. Jap. For. Soc., 1984, 66(3): 99-108.

[6]	Fengri Li, Junmin Wu, Shengli Lu The comparison between the Richards growth function and the Schnute growth model [J]. Journal of Northeast Forestry University, 1993, 21(4): 15-23. (in Chinese, with English abstract)

[7]	Li Fengri. 1995. A Simulation System of Stand Dynamics for Larch Plantation. Ph.D. Thesis, Beijing Forestry Univ., P. R. China. 203pp. (in Chinese, with English abstract)

[8]	Fengri Li, Yonghe Wang, Lijun Hou Comparison of the Chapman-Richards function with the Schnute model in stand growth [J]. Journal of Forestry Research, 1997, 8(3): 137-143.

[9]	Jingwen Li Ecology and Management for Mixed Korean Pine Forests [M], 1997 Harbin: Northeast For. Univ. Press (In Chinese)

[10]	Osumi, S., Ishikawa, Y. 1983. Applicability of the Richards’ growth function to analysis of growth of tree [R]. Sci. Rep. of the Kyoto Prefecture Univ., Agri. No. 35. p. 49–76.

[11]	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 stands [J]. For. Sci., 1973, 19(1): 2-22.

[12]	Ratkowsky D.A. Nonlinear Regression Modeling [M], 1983 Harbin: Marcel Dekker

[13]	Richards F.J. A flexible growth function for empirical use [J]. J. Exp. Botany, 1959, 10(2): 290-300.

[14]	SAS Institute Inc. SAS/STAT User’s Guide, Version 6.0 edition, 1990 Cary NC: SAS Institute, Inc.

[15]	Schnute J. A versatile growth model with statistically stable parameters [J]. Can. J. Fish. Aquat. Sci., 1981, 38: 1128-1140.

[16]	Shvets V., Zeide B. Investigation parameters of growth equation [J]. Can. J. For. Res., 1996, 26(11): 1980-1990.

[17]	Yang Yongqi, Feng Fenglong The application of the Schnute growth function to the analysis of stand structure of man-made forest in Taiwan [J]. Quarterly J. Chinese Forestry, 1989, 22(3): 3-17. (in Chinese, with English abstract)

[18]	Zeide B. Analysis of growth equations [J]. For. Sci., 1993, 39(3): 594-616.

[19]	Shao-ang Zhang, Dongmej Wang New theoretical growth model based on analysis of Richards equation [J]. Journal of Beijing Forestry University, 1992, 14(3): 99-105. (in Chinese, with English abstract)