Model
The AIDS model is based on a first specification of a cost/expenditure function c(u,p): : where ''p'' stand for price of L goods, and ''u'' the utility level. This specification satisfies homogeneity of order 1 in prices, and is a second order approximation of any cost function. From this, demand equations are derived (using Shephard's lemma), but are however simpler to put in term of budget shares : : with is the total expenditure, , and ''P'' is the price index defined byUnder relevant constraints on the parameters , These budget shares equations share the properties of a demand function: * homogeneous of degree 0 in prices and total expenditure * sum of budget shares add up to 1 (i.e., ) * satisfy the symmetry of the Slutsky matrixOrigin
First developed by Angus Deaton and John Muellbauer, the AIDS system is derived from the "Price Invariant Generalized Logarithmic" (PIGLOG) model which allows researchers to treat aggregate consumer behavior as if it were the outcome of a single maximizing consumer.Applications
Many studies have used the AIDS system to determine the optimal allocation of expenditure among broad commodity groups, i.e., at high levels of commodity aggregation. In addition, the AIDS system has been used as a brand demand system to determine optimal consumption rates for each brand using product category spending and brand prices alone. Assuming weak separability of consumer preferences, the optimal allocation of expenditure among the brands of a given product category can be determined independently of the allocation of expenditure within other product categories.Extensions of the Almost Ideal Demand System
An extension of the almost ideal demand system is the Quadratic Almost Ideal Demand System (QUAIDS) which was developed by James Banks, Richard Blundell, and Arthur Lewbel.Banks, James, Richard Blundell, and Arthur Lewbel. "Quadratic Engel curves and consumer demand." Review of Economics and statistics 79.4 (1997): 527-539. It considers the existence of non-linear engel curve which is not expressed in the standard almost ideal demand system.References
{{Reflist Demand Microeconomics Mathematical economics