Stochastic Equilibria: Existence, Spanning Number, and the 'No Expected Financial Gain from Trade' Hypothesis

Stochastic equilibria under uncertainty with continuous-time security trading and consumption are demonstrated in a general setting. A common question is whether the current price of a security is an unbiased predictor of the future price of the security plus intermediate dividends. This is the hypothesis of "no expected financial gains from trade." The relevance of this hypothesis in multi-good economies is called into question by the following demonstrated fact. For each set of probability assessments there exists a corresponding equilibrium, one with the original agents, original equilibrium allocations, and no expected financial gains from trade under the given probability assessments. The spanning number of the economy is defined as the fewest number of security markets required to sustain a complete markets equilibrium (in a dynamic sense made precise in the paper). The spanning number is linked directly to agent primitives, in particular the manner in which new information resolves uncertainty over time. The spanning number is shown to be invariant under bounded changes in expectations. Several examples are given in which the spanning number is finite even though the number of potential states of the world is infinite.

[1]  Nicholas C. Yannelis,et al.  EQUILIBRIA IN BANACH LATTICES WITHOUT ORDERED PREFERENCES , 1986 .

[2]  Andreu Mas-Colell,et al.  The Price Equilibrium Existence Problem in Topological Vector Lattice s , 1986 .

[3]  F. Black,et al.  The Pricing of Options and Corporate Liabilities , 1973, Journal of Political Economy.

[4]  J. Mémin,et al.  Espaces de semi martingales et changement de probabilité , 1980 .

[5]  E. Lenglart,et al.  Transformation des martingales locales par changement absolument continu de probabilities , 1977 .

[6]  R. C. Merton,et al.  Optimum consumption and portfolio rules in a continuous - time model Journal of Economic Theory 3 , 1971 .

[7]  D. Duffie Competitive equilibria in general choice spaces , 1986 .

[8]  R. C. Merton,et al.  Optimum Consumption and Portfolio Rules in a Continuous-Time Model* , 1975 .

[9]  W. Brock,et al.  Dynamics under Uncertainty , 1979 .

[10]  D. Duffie Predictable representation of martingale spaces and changes of probability measure , 1985 .

[11]  C. Dellacherie Intégrales stochastiques par rapport aux processus de Wiener et de Poisson , 1974 .

[12]  S. Ross,et al.  AN INTERTEMPORAL GENERAL EQUILIBRIUM MODEL OF ASSET PRICES , 1985 .

[13]  Darrell Duffie,et al.  Implementing Arrow-Debreu equilbria by continuous trading of a few long-lived securities , 1985 .

[14]  Darrell Duffie,et al.  Stochastic equilibria with incomplete financial markets , 1987 .

[15]  David M. Kreps,et al.  Martingales and arbitrage in multiperiod securities markets , 1979 .

[16]  Pravin Varaiya,et al.  The Multiplicity of an Increasing Family of $\Sigma$-Fields , 1974 .

[17]  R. C. Merton,et al.  AN INTERTEMPORAL CAPITAL ASSET PRICING MODEL , 1973 .

[18]  H. Kunita,et al.  On Square Integrable Martingales , 1967, Nagoya Mathematical Journal.

[19]  Roy Radner,et al.  Existence of Equilibrium of Plans, Prices, and Price Expectations in a Sequence of Markets , 1972 .

[20]  Chi-Fu Huang An Intertemporal General Equilibrium Asset Pricing Model: The Case of Diffusion Information , 1987 .

[21]  O. Hart On the optimality of equilibrium when the market structure is incomplete , 1975 .

[22]  Beth E Allen,et al.  Neighboring Information and Distributions of Agents' Characteristics Under Uncertainty , 1983 .

[23]  K. Arrow,et al.  EXISTENCE OF AN EQUILIBRIUM FOR A COMPETITIVE ECONOMY , 1954 .

[24]  Douglas T. Breeden An Intertemporal Asset Pricing Model with Stochastic Consumption and Investment Opportunities , 1979 .

[25]  William R. Zame,et al.  Competitive Equilibria in Production Economies with an Infinite-Dimensional Commodity Space , 1987 .

[26]  David M. Kreps Multiperiod Securities and the Efficient Allocation of Risk: A Comment on the Black-Scholes Option Pricing Model , 1982 .

[27]  J. Harrison,et al.  Martingales and stochastic integrals in the theory of continuous trading , 1981 .