[1]
|
Appel, D. (2001). Forest rotation lengths under carbon sequestration payments. Conference of Economists, University of Western Australia, Perth. http://129.3.20.41/econ-wp/othr/papers/0110/0110007.pdf
|
[2]
|
Asante, P., Armstrong, G. W., & Adamowicz, L. W. (2011). Carbon sequestration and the optimal forest harvest decision: A dynamic programming approach considering biomass and dead organic matter. Journal of Forest Economics, 17, 3-17.
doi:10.1016/j.jfe.2010.07.001
|
[3]
|
Bellman, R. E. (1957). Dynamic programming. Princeton, NJ: Princeton University Press.
|
[4]
|
Chen, C. M., Rose, D. W., & Leary R. A. (1980). How to Formulate and solve optimal stand density over time problem for even-aged stands using dynamic programming. General Technical Report NC56, 17p.
|
[5]
|
Chikumbo, O. (1996). Applicability of dynamical modelling and theoretical control methods in tree growth prediction and planning. Ph.D. Thesis, Canberra: The Australian National University, 273p.
|
[6]
|
Chikumbo, O. (2009a). An optimal regime model using competitive coevolutionary genetic algorithms. In A. Dourado, A. Rosa, & K. Ma-dani (Eds.), Proceedings of the International Joint Conference on Computational Intelligence (pp. 210-217). Portugal: Institute for Systems and Technologies of Information, Control and Communication (ISTICC).
|
[7]
|
Chikumbo, O. (2009b). Exploration and exploitation in function optimization using stochastic generate-and-test algorithms. In H. R. Arabnia, & A. M. G. Solo, (Eds.), Proceedings of the 2009 International Conference on Genetic and Evolutionary Methods (pp. 22-27). Las Vegas, NV: CSREA Press.
|
[8]
|
Chikumbo, O. (2012). Using different approaches to approximate a Pareto front for a multi-objective evolutionary algorithm: Optimal thinning regimes for Eucalyptus fastigata. International Journal of Forestry Research, 2012, 189081. doi:10.1155/2012/189081
|
[9]
|
Chikumbo, O., & Mareels, I. M. Y. (2003). Predicting terminal time and final crop number for a forest plantation stand: Pontryagin’s Maximum Principle. In E. Tiezzi, C. A. Brebbia, & J. L. Uso (Eds.), Ecosystems and sustainable development (pp. 1227-1235). Southampton: WIT Press.
|
[10]
|
Chikumbo, O., & Nicholas, I. (2011). Efficient thinning regimes for Eucalyptus fastigata: Multi-objective stand-level optimisation using the island model genetic algorithm, Ecological Modelling, 222, 1683-1695. doi:10.1016/j.ecolmodel.2011.03.004
|
[11]
|
Coello, C.A. (1996). An empirical study of evolutionary techniques for multi-objective optimization in engineering design. Ph.D. Thesis, New Orleans, LA: Department of Computer Science, Tulane University.
|
[12]
|
De Jong, B. H. J., Tipper, R., & Montoya-Gómez, (2000). An economic analysis of the potential for carbon sequestration by forests: Evidence from southern Mexico. Ecological Economics, 33, pp. 313327. doi:10.1016/S0921-8009(99)00162-7
|
[13]
|
Faustmann, M. (1995). Calculation of the value which forest land and immature stands possess for forestry. Journal of Forest Economics, 1, 7-44.
|
[14]
|
Fonseca, C. M., & Fleming, P. J. (1993). Genetic algorithms for multiple objective optimization: Formulation, discussion and generalizetion. In S. Forrest (Ed.), Proceedings of the Fifth International Conference on Genetics Algorithms, San Mateo, CA: Morgan Kaufmann Publishers.
|
[15]
|
Gibbons, J. D. (1985). Nonparametric statistical inference (2nd ed.). New York: Marcel Dekker.
|
[16]
|
Gutrich, J., & Howarth, R. B. (2007). Carbon sequestration and the optimal management of New Hampshire timber stands. Ecological Economics, 62, 441-450. doi:10.1016/j.ecolecon.2006.07.005
|
[17]
|
Haslett, A. N. (1988). Properties and utilisation of exotic speciality timber grown in New Zealand. Part V: Ash eucalypts and Eucalyptus nitens. New Zealand Forest Research Institute, FRI Bulletin No. 119, 20p.
|
[18]
|
Hool, J. N. (1965). A dynamic programming probability approach to forest production control. Social American Forest Proceedings, 191193.
|
[19]
|
Klemperer, W. D. (1996). Forest resource economics and finance. New York, NY: McGraw-Hill, Inc.
|
[20]
|
Kruskal W., & Wallis W. A. (1952). Use of ranks in one-criterion analysis of variance. Journal of the American Statistical Association, 47, 583-621.
|
[21]
|
Ljung, L. (1987). System identification: Theory for the user. Saddle River, NJ: Prentice Hall.
|
[22]
|
Malinowska, A. B., & Torres, D. F. M. (2007). Non-essential functionals in multi-objective optimal control problems. Proceedings of the Estonian Academy of Sciences: Physics & Mathematics, 56, 336-346.
|
[23]
|
Mayo J. H., & Straka T. J. (2005). The holding value premium in standing timber valuation. Appraisal Journal, 73, 98-106.
|
[24]
|
Meade, R., Fiuza, G., & Lu, A. (2008). Forest and forest land valuation: How to value forests and forest land to include carbon costs and benefits. Wellington: NZ Institute for the Study of Competition and Regulation Inc., Victoria University of Wellington.
|
[25]
|
Menczer, F., Degeratu, M., & Street, W. N. (2000). Efficient and scalable Pareto optimisation by evolutionary local selection algorithms. Evolutionary Computation, 8, 223-247.
doi:10.1162/106365600568185
|
[26]
|
Miller, J. T., Hay, A. E., & Ecroyd, C. E. (2000). Introduced forest trees in New Zealand: Recognition, role and seed source, Part 18. The Ash Eucalypts: E fastigata, E. regnans, E. obliqua, E. fraxinoides, E. delegatensis, E. fraxinoides, E. sieberi, E. oreades, E. pauciflora, E. dendromorpha and E. paliformis. NZFRI Bulletin 124.
|
[27]
|
Nelder, J. A. (1962). New kinds of systematic designs for spacing experiments. Biometrics, 18, 283-307. doi:10.2307/2527473
|
[28]
|
Newman D. H., & Wear D.N . (1993). Production economics of private forestry: A comparison of industrial and nonindustrial forest owners. American Journal of Agricultural Economics, 75, 674-684.
doi:10.2307/1243574
|
[29]
|
Osborne, M. J., & Rubenstein, R. (1994). A course in game theory (p. 7). Cambridge, MA: MIT Press.
|
[30]
|
Polheim, H. (2006). GEATbx: Introduction, evolutionary algorithms: Overview, methods and operators. URL. http://www.geatbx.com
|
[31]
|
Straka, T. J. & Bullard S. H. (1996) Land expectation value calculation in timberland valuation. Appraisal Journal, 64, 399-405.
|
[32]
|
Turner, J.A., West, G., Dungey, H., Wakelin, S., Maclaren, P., Adams, T., & Silcock, P. (2008). Managing New Zealand planted forests for carbon—A review of selected management scenarios and identification of knowledge gaps, Report by Scion for the New Zealand Ministry of Agriculture and Forestry. Rotorua: Scion.
|
[33]
|
van Kooten, G. C., Binkley, C. S., & Delcourt, G. (1995). Effect of carbon taxes and subsidies on optimal forest rotation age and supply of carbon services, American Journal of Agricultural Economics, 77, 365-374. doi:10.2307/1243546
|
[34]
|
White, A. (2007). Carbon trading outlook: Any additional measures? The Bridge magazine, 7, 38-41.
|
[35]
|
Zitzler, E., Deb, K., & Thiele, L. (2000). Comparison of multi-objective evolutionary algorithms: Empirical results. Evolutionary Computation, 8, 173-195. doi:10.1162/106365600568202
|
[36]
|
|