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On the Consistency of the Black-Scholes Model with a General Equilibrium Framework

Published online by Cambridge University Press:  06 April 2009

Avi Bick
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Abstract

We construct a simple economy with consumption only at the final date in which we “endogenize” the stochastic behavior of prices assumed in the Black-Scholes model. Certain preferences (constant proportional risk aversion) and beliefs are shown to be sufficient and necessary, in certain respects, for the existence of such an equilibrium. The analysis is then generalized to a continuous-consumption framework, in which we embed the Merton proportional dividend model.

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Type
Research Article
Information
Journal of Financial and Quantitative Analysis , Volume 22 , Issue 3 , September 1987 , pp. 259 - 275
Copyright
Copyright © School of Business Administration, University of Washington 1987

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References

[1]Bergman, Y. Z.A Characterization of Self-Financing Portfolio Strategies.” Working Paper no. 113, Research Program in Finance, Univ. of Calif., Berkeley (1981).Google Scholar
[2]Bick, A.Comments on the Valuation of Derivative Assets.’ Journal of Financial Economics, 10 (09 1982), 331345.CrossRefGoogle Scholar
[3]Bick, Avi “Topics in the Theory of Arbitrage.” Unpubl. Ph.D. diss., Univ. of Calif., Berkeley (1983).Google Scholar
[4]Bick, AviA Characterization of Viable Diffusion Price Processes.” Working paper, New York Univ. (revised 09 1986).Google Scholar
[5]Billingsley, P.Probability and Measure. New York: Wiley (1979).Google Scholar
[6]Black, F., and Scholes, M.. “The Pricing of Options and Corporate Liabilities.” Journal of Political Economy, 81 (05/06 1973), 637659.CrossRefGoogle Scholar
[7]Breeden, D. T.An Intertemporal Asset Pricing Model with Stochastic Consumption and Investment Opportunities.” Journal of Financial Economics, 7 (09 1979), 265296.CrossRefGoogle Scholar
[8]Breeden, D. T., and Litzenberger, R. H.. “Prices of State-Contingent Claims Implicit in Option Prices.” Journal of Business, 51 (10 1978), 621651.CrossRefGoogle Scholar
[9]Brennan, M. J.The Pricing of Contingent Claims in Discrete Time Models.” Journal of Finance, 34 (03 1979), 5368.CrossRefGoogle Scholar
[10]Cox, J. C; Ingersoll, J. E.; and Ross, S. A.. “An Intertemporal General Equilibrium Model of Asset Prices.” Econometrica, 53 (03 1985), 363384.CrossRefGoogle Scholar
[11]Cox, J. C, and Ross, S. A.. “The Valuation of Options for Alternative Stochastic Processes.” Journal of Financial Economics, 3 (03 1976), 145166.CrossRefGoogle Scholar
[12]Duffie, D.Stochastic Equilibria: Existence, Spanning Number, and the ‘No Expected Gains from Trade’ Hypothesis.” Econometrica, 54 (09 1986), 11611183.CrossRefGoogle Scholar
[13]Duffie, D., and Huang, C.. “Implementing Arrow-Debreu Equilibria by Continuous Trading of Few Long-Lived Securities.” Econometrica, 53 (11 1985), 13371356.CrossRefGoogle Scholar
[14]Dybvig, P. H. “A Positive Wealth Constraint Precludes Arbitrage Profits (e.g., from Doubling) in the Black-Scholes Model.” Unpubl. ms., Yale Univ. (1982).Google Scholar
[15]Friedman, A.Stochastic Differential Equations and Applications, Vol. 1. New York: Academic Press (1975).Google Scholar
[16]Grossman, S. J., and Shiller, R. J.. “Consumption Correlatedness and Risk Measurement in Economies with Non-Traded Assets and Heterogeneous Information.” Journal of Financial Economics, 10 (07 1982), 195210.CrossRefGoogle Scholar
[17]Harrison, J. M., and Pliska, S. R.. “Martingales and Stochastic Intregals in the Theory of Continuous Trading.” Stochastic Processes and Their Applications, 11 (08 1981), 215260.CrossRefGoogle Scholar
[18]Huang, C.Information Structure and Equilibrium Asset Prices.” Journal of Economic Theory, 35 (02 1985), 3371.CrossRefGoogle Scholar
[19]Bick, AviAn Intertemporal General Equilibrium Asset Pricing Model: The Case ofa Diffusion Information.” Econometrica, 55 (01 1987), 117142.Google Scholar
[20]Karlin, S., and Taylor, H. M.. A First Course in Stochastic Processes, 2nd ed.New York: Academic Press (1975).Google Scholar
[21]Karlin, S., and Taylor, H. M.A Second Course in Stochastic Processes. New York: Academic Press (1981).Google Scholar
[22]Kreps, D. M.Three Essays on Capital Markets.” IMSSS technical report no. 298, Stanford Univ. (1979).Google Scholar
[23]Kreps, D. M. “Multiperiod Securities and the Efficient Allocation of Risk: A Comment on the Black-Scholes Option Pricing Model.” In The Economics of Information and Uncertainty, McCall, J. J., ed. Chicago: Univ. of Chicago Press (1982).Google Scholar
[24]Latham, M.Doubling Strategies Limited Liability and the Definition of Continuous Time.” Working Paper no. 1131–80, Sloan School of Management, MIT (revised 11 1981).Google Scholar
[25]Lucas, R. E.Asset Prices in an Exchange Economy.” Econometrica, 46 (11 1978), 14291445.CrossRefGoogle Scholar
[26]Merton, R. C.Lifetime Portfolio Selection under Uncertainty: the Continuous Time Case.” Review of Economics and Statistics, 51 (08 1969), 247257.CrossRefGoogle Scholar
[27]Merton, R. C.Optimum Consumption and Portfolio Rules in a Continuous Time Model.” Journal of Economic Theory, 3 (12 1971), 373413.CrossRefGoogle Scholar
[28]Merton, R. C.Theory of Rational Option Pricing.” Bell Journal of Economics, 4 (Spring 1973), 141–183.Google Scholar
[29]Merton, R. C.On the Pricing of Contingent Claims and the Modigliani-Miller Theorem.” Journal of Financial Economics, 5 (11 1977), 241249.CrossRefGoogle Scholar
[30]Radner, R.Existence of Equilibrium of Plans, Prices and Price Expectations in a Sequence of Markets.” Econometrica, 40 (03 1972), 289303.CrossRefGoogle Scholar
[31]Rubinstein, M.The Valuation of Uncertain Income Streams and the Pricing of Options.” Bell Journal of Economics, 1 (Autumn 1976), 407425.CrossRefGoogle Scholar
[32]Smith, C. W.Option Pricing: A Review.” Journal of Financial Economics, 3 (01/03 1976), 352.CrossRefGoogle Scholar
[33]Stapleton, R. C, and Subrahmanyam, M. G.. “The Valuation of Multivariate Contingent Claims in Discrete Time Models.” Journal of Finance, 39 (03 1984), 207228.CrossRefGoogle Scholar
[34]Stapleton, R. C, and Subrahmanyam, M. G.The Valuation of Options when Asset Returns Are Generated by a Binomial Process.” Journal of Finance, 39 (12 1984), 15251539.CrossRefGoogle Scholar