English  |  正體中文  |  简体中文  |  Post-Print筆數 : 27 |  Items with full text/Total items : 113318/144297 (79%)
Visitors : 51000666      Online Users : 922
RC Version 6.0 © Powered By DSPACE, MIT. Enhanced by NTU Library IR team.
Scope Tips:
  • please add "double quotation mark" for query phrases to get precise results
  • please goto advance search for comprehansive author search
    •  Adv. Search
    HomeLoginUploadHelpAboutAdminister Goto mobile version


    Please use this identifier to cite or link to this item: https://nccur.lib.nccu.edu.tw/handle/140.119/83341


    Title: 連續時間模型下退休基金最適策略之研究
    Authors: 陳絳珠
    Contributors: 張士傑
    陳絳珠
    Keywords: 提撥政策
    資產配置
    評估測度
    動態規劃
    最適策略
    finding policy
    asset allocation
    risk measurement
    dynamic programming
    optimal strategy
    Date: 2000
    Issue Date: 2016-03-31 16:36:41 (UTC+8)
    Abstract: 本研究針對退休基金管理的兩項重要議題:提撥政策與資產配置作最適規劃之探討。由於傳統退休基金的評價僅考慮單一期間的離散時間模型,不若多期規劃的效率性,因此,本研究考量連續時間下,利用控制理論觀點,將提撥金額與資產配置視為可調節的因子,以風險最小化為最適定義,提供基金多期管理的有效方法。
    This study explores two critical issues in pension fund management: funding policy and asset allocation. The traditional valuation of pension fund is restricted in one-period setting under discrete-time framework, and it is not efficient comparing to the continuous-time models. Therefore, in this study, control theory is employed to obtain the optimal strategy based on a specific plan dynamics. Employer`s contributions and investment proportions are treated as the controllers in our model. Optimal solutions are obtained by minimizing the given risk performance in monitoring the multi-period fund management.
    Reference: 一、 中文部分
    林妙姍,確定提撥退休金計劃的應用與相關精算之研究,國立政治大學風險管理與保險研究所碩士論文,民87年。
    二、 英文部分
    Anderson, A. W., Pension Mathematics for Actuaries, 2nd ed. Winsted, Connecticut:Actex Publication, 1992.
    Bacinello, A.R., “A stochastic simulation procedure for pension scheme.” Insurance: Mathematics and Economics 7(1988): 153-161.
    Bellman, R., Dynamic Programming, Princeton, N.J.: Princeton University Press, 1957.
    Blake, D., “Pension schemes as options on pension fund assets: implications for pension fund management.” Insurance: Mathematics and Economics 23(1998): 263-286.
    Boulier, J. F., Trussant. E. and Florens. D., “A dynamic model for pension funds management.” Proceedings of the 5th AFIR International Colloquium 1(1995): 361-384.
    Boulier, J. F., Trussant. E. and Florens. D., “Optimizing investment and contribution polices of a defined benefit pension fund.” Proceedings of the 6th AFIR International Colloquium 1(1996): 593-607.
    Bowers, N. L., Gerber, H. U., Hickman, J. C., Jones, D. A. and Nesbitt, C. J. “Notes on the dynamics of pension funding.” Insurance: Mathematics and Economics 1(1982): 261-270.
    Burden R.L. and Faires J. D., Numerical Methods, PWS-KENT publishing company, Boston, 1993.
    Cairns, A. J. G., “Pension funding in a stochastic environment: the role of objectives in selecting an asset-allocation strategy.” Proceedings of the 5th AFIR International Colloquium 1(1995): 429-453.
    Cairns, A. J. G., “Continuous-time stochastic pension funding modelling,” Proceedings of the 6th AFIR International Colloquium 1(1996): 609-624.
    Cairns, A. J. G. and Parker, G., “Stochastic pension fund modelling.” Insurance: Mathematics and Economics 21(1997): 43-79.
    Carraro, C. and Sartore, D., Developments of Control Theory for Economic Analysis, Kluwer Academic Publishers, Boston, 1987
    Chang, S. C., “Optimal pension funding through dynamic simulations: the case of Taiwan public employees retirement system.” Insurance: Mathematics and Economics 24(1999): 187-199.
    Chang, S. C., “Stochatic analysis of the solvency risk for TAI-PERS using simulation-based forecast model.” Singapore International Insurance and Actuarial Journal 3(1),(1999): 65-81.
    Chang, S. C., “Realistic pension funding: a stochastic approach.” Journal of Actuarial Practice (2000)(in press).
    Chow, Gregory C., “Optimal stochastic control of linear economic systems.” Journal of Money, Credit and Banking 2(1970): 291-302.
    Chow, Gregory C., “Optimal control of linear econometric systems with finite time horizon.” International Economic Review 13(1),(1972a): 16-25.
    Chow, Gregory C., “How much could be Gained by optimal stochastic control policies?” Annals of Economic and Social Measurement 1(4),(1972b): 391-406.
    Daykin, C. D., Pentikainen, T. and Pesonen, M., Practical Risk Theory for Actuaries, Monographs on Statistics and Applied Probability 53, London, U.K.: Chapman and Hall, 1994.
    Dufresne, D., “Monents of pension contributions and fund levels when rates of return are random.” Journal of the Institute of Actuaries 115(1988): 535-544.
    Dufresne, D., “Stability of pension systems when rates of return are random.” Insurance: Mathematics and Economics 8(1989): 71-76.
    Fleming W. H. and Rishel R. W., Deterministic and Stochastic Optimal Contro, Springer-Verlag, New York, 1975.
    Friedman, Benjamin M., Methods in Optimization for Economic Stabilization Policy, Amsteerdam: North-Holland Publishing Company, 1973.
    Gerrard, R. and Haberman, S., “Stability of Pension Systems When Gains/Losses Are amortized and Rates of Return Are Autoregressive.” Insurance: Mathematics and Economics 18(1996): 59-71.
    Haberman, S., “Pension funding with time delays: A stochastic approach.” Insurance: Mathematics and Economics 11(1992): 179-189.
    Haberman, S., “Pension funding with time delays and autoregressive rates of investment return.” Insurance: Mathematics and Economics 13(1993): 45-56.
    Haberman, S., “Autoregressive rates of return and the variability of pension contributions and fund levels for a defined benefit pension scheme.” Insurance: Mathematics and Economics 14(1994): 219-240.
    Haberman, S., “Pension funding with time delays and the optimal spread period.” Astin Bulletin, Vol. 25. No. 2(1996):177-187.
    Haberman, S., “Stochastic investment returns and contribution rate risk in a defined benefit pension scheme.” Insurance: Mathematics and Economics 19(1997): 127-139.
    Haberman, S. and Sung, J. H., “Dynamic approaches to pension funding.” Insurance: Mathematics and Economics 15(1994): 151-162.
    Haberman, S. and Wong, L. Y., “Moving average rates of return and the variability of pension contributions and fund levels for a defined benefit pension scheme,” Insurance: Mathematics and Economics 20(1997): 115-135.
    Merton, R., Continuous-Time Finance, Blackwell, Cambridge, 1990.
    O’Brien, T., “A stochastic-dynamic approach to pension funding.” Insurance: Mathematics and Economics 5(1986): 141-146.
    O’Brien, T., “A two-parameter family of pension contribution functions and stochastic optimization.” Insurance: Mathematics and Economics 6(1987): 129-134.
    Owadally, M. L. and Haberman, S., “Pension fund dynamics and gains/ losses due to random rates of investment return.” North American Actuarial Journal, Vol. 3. No. 3(1999):105-117.
    Petit, M. L., Control Theory and Dynamic Games in Economic Policy Analysis, Cambridge University Press, Cambridge New York, 1990.
    Phillips, A. W., “The relation between unemployment and the rate of change of money wage rates in the United Kingdom, 1861-1957.” Econometrica 25(1958): 283-299.
    Pindyck, Robert S., Optimal Planning for Economic Stabilization, Amsterdam: North-Holland Publishing Company, 1973.
    Runggaldier, W. J., “Concept and methods for discrete and continuous time control under uncertainty.” Insurance: Mathematics and Economics 22(1998): 25-39.
    Sch l, M., “On piecewise deterministic Markov control process: Control of jumps and of risk processes in insurance.” Insurance: Mathematics and Economics 22(1998): 75-91.
    Simon, H. A., “On the application of servomechanism theory in the study of production control.” Econometrica(1952): 247-268.
    Simon, H. A., “Dynamic programming under uncertainty with a quadratic criterion function. ” Econometrica 24(1957): 74-81.
    Tustin, A., The Mechanism of Economic Systems, Cambridge, Mass: Harvard University Press, 1953.
    Voelker, Craig A., “Strategic asset allocation for pension plans.” Record V24n2, Society of Actuaries,1998.
    Whittle, P., Prediction and Regulation by Linear Least Square Methods, New York: D. Van Nostrand Company, 1963.
    Winklevoss, H. E., Pension Mathematics with Numerical Illustrations, 2nd edition, Pension Research Council Publications, 1993.
    Description: 碩士
    國立政治大學
    風險管理與保險研究所
    Source URI: http://thesis.lib.nccu.edu.tw/record/#A2002002021
    Data Type: thesis
    Appears in Collections:[風險管理與保險學系] 學位論文

    Files in This Item:

    There are no files associated with this item.



    All items in 政大典藏 are protected by copyright, with all rights reserved.


    社群 sharing

    著作權政策宣告 Copyright Announcement
    1.本網站之數位內容為國立政治大學所收錄之機構典藏,無償提供學術研究與公眾教育等公益性使用,惟仍請適度,合理使用本網站之內容,以尊重著作權人之權益。商業上之利用,則請先取得著作權人之授權。
    The digital content of this website is part of National Chengchi University Institutional Repository. It provides free access to academic research and public education for non-commercial use. Please utilize it in a proper and reasonable manner and respect the rights of copyright owners. For commercial use, please obtain authorization from the copyright owner in advance.

    2.本網站之製作,已盡力防止侵害著作權人之權益,如仍發現本網站之數位內容有侵害著作權人權益情事者,請權利人通知本網站維護人員(nccur@nccu.edu.tw),維護人員將立即採取移除該數位著作等補救措施。
    NCCU Institutional Repository is made to protect the interests of copyright owners. If you believe that any material on the website infringes copyright, please contact our staff(nccur@nccu.edu.tw). We will remove the work from the repository and investigate your claim.
    DSpace Software Copyright © 2002-2004  MIT &  Hewlett-Packard  /   Enhanced by   NTU Library IR team Copyright ©   - Feedback