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Necessary and Sufficient Conditions for the Mean-Variance Portfolio Model with Constant Risk Aversion

Journal of Financial and Quantitative Analysis 1981 16(2), 169
The familiar two-parameter model for portfolio decisions, attributed to Markowitz [11], has individuals maximizing an objective function, ϕ [E(Y), V(Y)], of mean and variance of end-of-period wealth, subject to a constraint imposed by initial wealth. In the usual version there is an arbitrary number, n, of risky assets with stochastic end-of-period values (price plus dividend) represented by the vector X with exogenously given mean vector μ and nonsingular variance matrix σ. There is also one riskless asset, whose certain end-of-period value per dollar invested is p. Final wealth, as constrained by initial wealth, W, is given by Y = WP + a' (X – OP), where a and P are vectors of risky asset quantities and prices. Assuming ϕE > 0 (wealth preference), ϕV

Discussion: Information Sets, Macroeconomic Reform, and Stock Prices

Journal of Financial and Quantitative Analysis 1981 16(4), 511
Dennis W. Draper, Discussion: Information Sets, Macroeconomic Reform, and Stock Prices, The Journal of Financial and Quantitative Analysis, Vol. 16, No. 4, Proceedings of 16th Annual Conference of the Western Finance Association, June 18-20, 1981, Jackson Hole, Wyoming (Nov., 1981), pp. 511-513

The Elasticity of Derived Net Supply and a Generalized Le Chatelier Principle

Review of Economic Studies 1981 48(1), 63
Journal Article The Elasticity of Derived Net Supply and a Generalized Le Chatelier Principle Get access W. E. Diewert W. E. Diewert University of British Columbia Search for other works by this author on: Oxford Academic Google Scholar The Review of Economic Studies, Volume 48, Issue 1, January 1981, Pages 63–80, https://doi.org/10.2307/2297121 Published: 01 January 1981 Article history Received: 01 August 1977 Accepted: 01 March 1980 Published: 01 January 1981

Social Decision Functions and Strongly Decisive Sets

Review of Economic Studies 1981 48(2), 343
Several recent papers have developed partial or complete characterization of classes of social decision functions in terms of constructs based upon the associated collections of decisive sets. Hansson (1976) interpreted Arrow’s impossibility theorem in terms of the associated ultrafilter of decisive sets. Brown (1973) extended this correspondence to the case of acyclic choice functions and prefilters. To deal with the multiplicity of social decision functions having the same collection of decisive sets, Brown restricted the class of social decision functions while Ferejohn and Fishburn (1979) and Blau and Brown (1980) added structure to the collections of decisive sets, and thereby obtained a characterization of certain social decision functions.

The relationship between return and market value of common stocks

Journal of Financial Economics 1981 9(1), 3-18
This study examines the empirical relationship between the return and the total market value of NYSE common stocks. It is found that smaller firms have had higher risk adjusted returns, on average, than larger firms. This ‘size effect’ has been in existence for at least forty years and is evidence that the capital asset pricing model is misspecified. The size effect is not linear in the market value; the main effect occurs for very small firms while there is little difference in return between average sized and large firms. It is not known whether size per se is responsible for the effect or whether size is just a proxy for one or more true unknown factors correlated with size.

The Measurement of Deadweight Loss Revisited

Econometrica 1981 49(5), 1225
modities (such as various consumer goods and labor), M fixed factors (such as land, natural resources and various types of fixed capital), and a government which taxes commodities and fixed factors in order to finance various govern- ment expenditures. It is well known2 that if the government can raise its required revenue by taxing the fixed factors alone, then the resulting allocation of resources is Pareto optimal-no single household's utility or real income can be increased without decreasing the utility of some other household. Suppose we are at an initial equilibrium where government revenue is being raised by taxing the fixed factors alone. Then the resulting equilibrium can be rationalized by maximizing a certain weighted sum of utility functions subject to various feasibility constraints. Now think of the government replacing the taxes on fixed factors with distortionary commodity taxes. In Section 3, we calculate the second order directional derivative of the above weighted sum of utility functions with respect to any feasible direction of tax change, evaluated at the initial equilibrium which is Pareto optimal. Of course, the first order directional derivatives of the weighted sum of utility functions with respect to feasible directions of tax change are zero evaluated at this initial equilibrium. We obtain a measure of economic due to tax distortions which is virtually identical to that of Boiteux (3, p. 113) and which bears a resemblance to the dead loss of Hotelling (22, p. 254), the consumer's surplus measures of Hicks (19; 20, pp. 330-3), and the deadweight loss measure of Harberger (16, p. 61; 17, p. 788). In Section 4, we calculate a measure of welfare based on Debreu's (4, 5) coefficient of resource utilization (which is a modification of a measure of due to Allais (1, 2)) and we show that under certain conditions, the Hotelling,