Expenditure minimization problem

For other uses, see Minimisation.

In microeconomics, the expenditure minimization problem is another perspective on the utility maximization problem: "how much money do I need to reach a certain level of happiness?". This question comes in two parts. Given a consumer's utility function, prices, and a utility target,

Expenditure function

Formally, the expenditure function is defined as follows. Suppose the consumer has a utility function u defined on L commodities. Then the consumer's expenditure function gives the amount of money required to buy a package of commodities at given prices p that give utility of at least u^*,

e(p, u^*) = \min_{x \in \geq{u^*}} p \cdot x

where

\geq{u^*} = \{x \in \mathbb{R}^L_+ : u(x) \geq u^*\}

is the set of all packages that give utility at least as good as u^*.

Hicksian demand correspondence

Secondly, the Hicksian demand function h(p, u^*) is defined as the cheapest package that gives the desired utility. It can be defined in terms of the expenditure function with the Marshallian demand function

h(p, u^*) = x(p, e(p, u^*)). \,

The relationship between the utility function and Marshallian demand in the utility maximization problem mirrors the relationship between the expenditure function and Hicksian demand in the expenditure minimization problem. It is also possible that the Hicksian and Marshallian demands are not unique (i.e. there is more than one commodity bundle that satisfies the expenditure minimization problem); then the demand is a correspondence, and not a function. This does not happen, and the demands are functions, under the assumption of local nonsatiation.

See also

References

External links

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