Hostname: page-component-cd9895bd7-lnqnp Total loading time: 0 Render date: 2024-12-23T17:22:40.711Z Has data issue: false hasContentIssue false
  • English
  • Français

Impact of Income on Price and Income Responses in the Differential Demand System

Published online by Cambridge University Press:  26 January 2015

Mark G. Brown
Mark G. Brown*
Affiliation:
Economic and Market Research Department, Florida Department of Citrus, University of Florida, Gainesville, FL
Get access Rights & Permissions [Opens in a new window]

Abstract

An extension of the Rotterdam model is developed that makes the model's income flexibility and marginal propensities to consume varying coefficients. Frisch's duality relationships that the second partial derivatives of demand with respect to income and prices are independent of the order of differentiation are imposed with the marginal propensities to consume specified as functions of income and price, and the Slutsky coefficients specified as functions of income only. A uniform substitute specification is used to analyze the conditional demands for a group of beverages.

Keywords

demandRotterdam modelvarying parametersC51D12Q11
Type
Articles
Information
Journal of Agricultural and Applied Economics , Volume 40 , Issue 2 , August 2008 , pp. 593 - 608
Copyright
Copyright © Southern Agricultural Economics Association 2008

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Barnett, W.A.On the Flexibility of the Rotterdam Model: A First Empirical Look.European Economic Review 24(1984):285–89.CrossRefGoogle Scholar
Barten, A.P.Theorie en empirie van een volledig stelsel van vraegvergelijkingen.” Ph.D. dissertation. Rotterdam: Netherlands School of Economics, 1966.Google Scholar
Barten, A.P.Maximum Likelihood Estimation of a Complete System of Demand Equations.” European Economic Review 1(1969):773.CrossRefGoogle Scholar
Barten, A.P.Towards a Levels Version of the Rotterdam and Related Demand Systems.” Contributions to Operations Research and Economics: The Twentieth Anniversary of Core. Cornet, B. and Tulkens, H., eds. Cambridge, MA: MIT Press, 1989.Google Scholar
Barten, A.P.Consumer Allocation Models: Choice of Functional Form.Empirical Economics 18(1993):129–58.CrossRefGoogle Scholar
Basmann, R.L.A Theory of Demand with Preference Variables.Econometrica 24(1956):4758.CrossRefGoogle Scholar
Bewley, R. Allocation Models: Specification, Estimation and Applications. Cambridge, MA: Ballinger Publishing Co., 1986.Google Scholar
Bouis, H.A Food Demand System based on Demand for Characteristics: If there is ‘Curvature’ in the Slutsky Matrix, What do the Curves Look Like and Why?Journal of Development Economics (1996):239–66.CrossRefGoogle Scholar
Brown, M., and Lee, J.. “Demand Systems for Competing Commodities: An Application of the Uniform Substitute Hypothesis.Review of Agricultural Economics 15(September 1993):577–89.CrossRefGoogle Scholar
Brown, M., and Lee, J.. “Incorporating Generic and Brand Advertising Effects in the Rotterdam Demand System.International Journal of Advertising 16(1997):211–20.CrossRefGoogle Scholar
Brown, M., and Lee, J.. “A Umform Substitute Demand Model with Varying Coefficients.Journal of Agricultural and Applied Economics 32(2000):19.CrossRefGoogle Scholar
Brown, M., and Lee, J.. “Restrictions on the Effects of Preference Variables in the Rotterdam Model.Journal of Agricultural and Applied Economics 34(2002):1726.CrossRefGoogle Scholar
Brown, M., Behr, R., and Lee, J.. “Conditional Demand and Endogeneity: A Case Study of Demand for Juice Products.Journal of Agricultural and Resource Economics 19(1994):129–40.Google Scholar
Buse, A.Goodness-of-Fit in Generalized Least Squares Estimation.The American Statistician 27(1973):106–8.Google Scholar
Byron, R.P.On the Flexibility of the Rotterdam Model.European Economic Review 24(1984):273–83.CrossRefGoogle Scholar
Deaton, A.S., and Muellbauer, J.. “An Almost Ideal Demand System.American Economic Review 70(1980a):312–26.Google Scholar
Deaton, A.S., and Muellbauer, J.. Economics and Consumer Behavior. Cambridge, MA: Cambridge University Press, 1980b.CrossRefGoogle Scholar
Deaton, A.S., and Muellbauer, J.. “Advertising and the Inter-Product Distribution of Demand.European Economic Review 31(1987):10511070.Google Scholar
Frisch, R.A Complete Scheme for Computing all Direct and Cross Demand Elasticities in a Model with Many Sectors.Econometrica 27,2(1959):177–96.CrossRefGoogle Scholar
Ichimura, S.A Critical Note on the Definition of Related Goods.Review of Economic Studies 18(19501951):179–83.CrossRefGoogle Scholar
Kinnucan, H., and Zheng, Y.. “Advertising's Effect on the Market Demand Elasticity: A Note.Agribusiness 20,2(2004):181–88.CrossRefGoogle Scholar
Makridakis, S., Wheelwright, S., and McGee, V.. Forecasting: Methods and Applications, 2nd ed. New York: John Wiley & Sons, 1983.Google Scholar
Mountain, D.C.The Rotterdam Model: An Approximation in Variable Space.Econometrica 56(1988):477–84.CrossRefGoogle Scholar
Paulus, J.D.The Estimation of Large Systems of Consumer Demand Equations Using Stochastic Prior Information.” Ph.D. dissertation. The University of Chicago, 1972.Google Scholar
Phlips, L. Applied Consumer Demand Analysis. Amsterdam: North-Holland Publishing Company, 1974.Google Scholar
Pollak, R.A., and Wales, T.J.. “Estimation of Complete Demand Systems from Household Budget Data: The Linear and Quadratic Expenditure Systems.American Economic Review 68:348–59.Google Scholar
Theil, H. Principles of Econometrics. New York: John Wiley & Sons, 1971.Google Scholar
Theil, H. Theory and Measurement of Consumer Demand, Volume I. Amsterdam: North-Holland Publishing Co., 1975.Google Scholar
Theil, H. Theory and Measurement of Consumer Demand, Volume II. Amsterdam: North-Holland Publishing Co., 1976.Google Scholar
Theil, H. The System-Wide Approach to Microeconomics. Chicago: University of Chicago Press, 1980a.Google Scholar
Theil, H. System-Wide Explorations in International Economics, Input-Output Analysis, and Marketing Research. Amsterdam: North-Holland Publishing Co., 1980b.Google Scholar
Theil, H., and Brooks, R.. “How Does the Marginal Utility of Income Change When Real Income Changes?European Economic Review 2(19701971):218–40.CrossRefGoogle Scholar
Theil, H., Chung, C., and Seale, J.L. Jr. Advances in Econometrics, Supplement 1, 1989, International Evidence on Consumption Patterns. London: JAI Press Inc., 1989.Google Scholar
Timmer, C.P.Is there Curvature in the Slutsky Matrix?Review of Economic and Statistics 63(1981):395402.CrossRefGoogle Scholar
Tinter, G.Complementarity and Shifts in DemandMetroeconomica 4:14.CrossRefGoogle Scholar