Hicksian demand function

Hicksian demand function

In microeconomics, a consumer's Hicksian demand correspondence is the demand of a consumer over a bundle of goods that minimizes their expenditure while delivering a fixed level of utility. If the correspondence is actually a function, it is referred to as the Hicksian demand function, or compensated demand function. The function is named after John Hicks.

Mathematically,

h(p, \bar{u}) = \arg \min_x \sum_i p_i x_i
{\rm such\ that} \ \  u(x) \geq \bar{u}

where h(p,u) is the Hicksian demand function, or commodity bundle demanded, at price level p and utility level \bar{u}. Here p is a vector of prices, and X is a vector of quantities demanded so that the sum of all pixi, is the total expense on goods X.

Contents

Relationship to other functions

Hicksian demand functions are often convenient for mathematical manipulation because they do not require income or wealth to be represented. Additionally, the function to be minimized is linear in the xi, which gives a simpler optimization problem. However, Marshallian demand functions of the form x(p,w) that describe demand given prices p and income w are easier to observe directly. The two are trivially related by

h(p, u) = x(p, e(p, u)), \

where e(p,u) is the expenditure function (the function that gives the minimum wealth required to get to a given utility level), and by

h(p, v(p, w)) = x(p, w), \

where v(p,w) is the indirect utility function (which gives the utility level of having a given wealth under a fixed price regime). Their derivatives are more fundamentally related by the Slutsky equation.

Whereas Marshallian demand comes from the Utility Maximization Problem, Hicksian Demand comes from the Expenditure Minimization Problem. The two problems are mathematical duals, and hence the Duality Theorem provides a method of proving the relationships described above.

The Hicksian demand function is intimately related to the expenditure function. If the consumer's utility function u(x) is locally nonsatiated and strictly convex, then h(p, u) = \nabla_p e(p, u).

Hicksian Demand and Compensated Price Changes

Downward sloping Marshallian demand curves show the effect of price changes on quantity demanded. As the price of a good rises, presumably the quantity of that good demanded will fall, holding wealth and other prices constant. However, this price changes due to both the income effect and the substitution effect. The substitution effect is a price change that alters the slope of the budget constraint but leaves the consumer on the same indifference curve (i.e., at the same level of utility.) By this effect, the consumer is posited to substitute toward the good that becomes comparatively less expensive. If the good in question is a normal good, then the income effect from the rise in purchasing power from a price fall reinforces the substitution effect. If the good is an inferior good, then the income effect will offset in some degree the substitution effect.

The Hicksian demand function is also downward sloping, but isolated the substitution effect by supposing the consumer is compensated exactly enough to purchase some bundle on the same indifference curve. Hicksian demand illustrates the consumer's new consumption basket after the price change while being compensated as to allow the consumer to be as happy as previously (to stay at the same level of utility). If the Hicksian demand function is "steeper" than Walrasian demand, the good is a normal good; otherwise, the good is inferior.

Mathematical Properties

If the consumer's utility function u(x) is continuous and represents a locally nonsatiated preference relation, then the Hicksian demand correspondence h(p,u) satisfies the following properties:

i. Homogeneity of degree zero in p: For all a > 0, h(ap,u) = h(p,u). This is because the same x that minimizes

pixi
i

also minimizes

apixi
i

subject to the same constraint.

ii. No excess demand: The constraint  u(x) \geq \bar{u} holds with strict equality,  u(x) = \bar{u} . This follows from continuity of the utility function. Informally, they could simply spend less until utility was exactly  \bar{u} .

See also

References

  • Mas-Colell, Andreu; Whinston, Michael & Green, Jerry (1995). Microeconomic Theory. Oxford: Oxford University Press. ISBN 0-19-507340-2. 

Wikimedia Foundation. 2010.

Игры ⚽ Нужно сделать НИР?

Look at other dictionaries:

  • Marshallian demand function — In microeconomics, a consumer s Marshallian demand function (named after Alfred Marshall) specifies what the consumer would buy in each price and wealth situation, assuming it perfectly solves the utility maximization problem. Marshallian demand… …   Wikipedia

  • Expenditure function — In microeconomics, the expenditure function describes the minimum amount of money an individual needs to achieve some level of utility, given a utility function and prices.Formally, if there is a utility function u that describes preferences over …   Wikipedia

  • Expenditure minimization problem — In microeconomics, the expenditure minimization problem is another perspective on the utility maximization problem: how much money do I need to be happy? . This question comes in two parts. Given a consumer s utility function, prices, and a… …   Wikipedia

  • ФУНКЦИЯ СПРОСА — (demand function) Функция, описывающая спрос на товар или услугу в соответствии с индивидуальными предпочтениями. См.: предпочтение потребителей (consumer preference). См. также: функция спроса Хикса (Hicksian demand function); функция спроса… …   Словарь бизнес-терминов

  • Value and Capital — is a book by the British economist John Richard Hicks, published in 1939. It is considered a classic exposition of microeconomic theory. A central result in consumer demand theory that the book builds on is that goods have value even with only… …   Wikipedia

  • List of mathematics articles (H) — NOTOC H H cobordism H derivative H index H infinity methods in control theory H relation H space H theorem H tree Haag s theorem Haagerup property Haaland equation Haar measure Haar wavelet Haboush s theorem Hackenbush Hadamard code Hadamard… …   Wikipedia

  • John Hicks — Infobox Scientist name = John R. Hicks image size = 180px birth date = birth date|1904|4|8|mf=y birth place = Warwick, England death date = death date and age|1989|5|20|1904|4|8|mf=y death place = New York City, New York nationality = United… …   Wikipedia

  • ФУНКЦИЯ КОМПЕНСИРОВАННОГО СПРОСА — (compensated demand function) См.: функция спроса Хикса (Hicksian demand function). Бизнес. Толковый словарь. М.: ИНФРА М , Издательство Весь Мир . Грэхэм Бетс, Барри Брайндли, С. Уильямс и др. Общая редакция: д.э.н. Осадчая И.М.. 1998 …   Словарь бизнес-терминов

  • Shephard's lemma — is a major result in microeconomics having applications in consumer choice and the theory of the firm. The lemma states that if indifference curves of the expenditure or cost function are convex, then the cost minimizing point of a given good (i) …   Wikipedia

  • Consumer choice — Economics …   Wikipedia

Share the article and excerpts

Direct link
Do a right-click on the link above
and select “Copy Link”