Walras's law

Walras's law is a principle in general equilibrium theory asserting that budget constraints imply that the values of excess demand (or, conversely, excess market supplies) must sum to zero. That is:

where is the price of good j and and are the demand and supply respectively of good j.

Walras's law is named for the economist Léon Walras[1] of the University of Lausanne who formulated the concept in his Elements of Pure Economics of 1874.[2] Although the concept was expressed earlier but in a less mathematically rigorous fashion by John Stuart Mill in his Essays on Some Unsettled Questions of Political Economy (1844),[3] Walras noted the mathematically equivalent proposition that when considering any particular market, if all other markets in an economy are in equilibrium, then that specific market must also be in equilibrium. The term "Walras's law" was coined by Oskar Lange[4] to distinguish it from Say's law. Some economic theorists[5] also use the term to refer to the weaker proposition that the total value of excess demand cannot exceed the total values of excess supply.

Definitions

Walras's law

Walras's law implies that the sum of the values of excess demands across all markets must equal zero, whether or not the economy is in a general equilibrium. This implies that if positive excess demand exists in one market, negative excess demand must exist in some other market. Thus, if all markets but one are in equilibrium, then that last market must also be in equilibrium.

This last implication is often applied in formal general equilibrium models. In particular, to characterize general equilibrium in a model with m agents and n commodities, a modeler may impose market clearing for n–1 commodities and "drop the n-th market-clearing condition." In this case, the modeler should include the budget constraints of all m agents (with equality). Imposing the budget constraints for all m agents ensures that Walras's law holds, rendering the n-th market-clearing condition redundant.

In the former example, suppose that the only commodities in the economy are cherries and apples, and that no other markets exist. This is an exchange economy with no money, so cherries are traded for apples and vice versa. If excess demand for cherries is zero, then by Walras's law, excess demand for apples is also zero. If there is excess demand for cherries, then there will be a surplus (excess supply, or negative excess demand) for apples; and the market value of the excess demand for cherries will equal the market value of the excess supply of apples.

Walras's law is ensured if every agent's budget constraint holds with equality. An agent's budget constraint is an equation stating that the total market value of the agent's planned expenditures, including saving for future consumption, must be less than or equal to the total market value of the agent's expected revenue, including sales of financial assets such as bonds or money. When an agent's budget constraint holds with equality, the agent neither plans to acquire goods for free (e.g., by stealing), nor does the agent plan to give away any goods for free. If every agent's budget constraint holds with equality, then the total market value of all agents' planned outlays for all commodities (including saving, which represents future purchases) must equal the total market value of all agents' planned sales of all commodities and assets. It follows that the market value of total value of excess demand in the economy must be zero, which is an the statement of Walras's law. Walras's law implies that if there are n markets and n-1 of these are in equilibrium then the last market must also be in equilibrium, a property which is essential in the proof of the existence of equilibrium.

Formal statement

Consider an exchange economy with agents and divisible goods.

For every agent , let be his initial endowment vector and his Marshallian demand function (demand as a function of prices and income).

Given a price vector , the income of consumer is . Hence, his demand is .

The excess demand function is:

Walras's law can be stated succinctly as:

PROOF: By definition of the excess demand:

The Marshallian demand is a bundle that maximizes the agent's utility, given the budget constraint. The budget constraint here is:

Hence, all terms in the sum are 0 so the sum itself is 0.[6]:317–318

Implications

Labor market

Neoclassical macroeconomic reasoning concludes that because of Walras's law, if all markets for goods are in equilibrium, the market for labor must also be in equilibrium. Thus, by neoclassical reasoning, Walras's law contradicts the Keynesian conclusion that negative excess demand and consequently, involuntary unemployment, may exist in the labor market, even when all markets for goods are in equilibrium. The Keynesian rebuttal is that this neoclassical perspective ignores financial markets, which may experience excess demand (such as a Keynesian liquidity trap) that permits an excess supply of labor and consequently, temporary involuntary unemployment, even if markets for goods are in equilibrium.

See also

References

  1. Barron, John M.; Ewing, Bradley T.; Lynch, Gerald J. (2006), Understanding macroeconomic theory, Taylor & Francis, p. 1, ISBN 978-0-415-70195-2
  2. "Walras' Law". Investopedia. Retrieved March 17, 2015.
  3. Ariyasajjakorn, Danupon (2007), Trade, foreign direct investment, technological change, and structural change in labor usage, ProQuest, p. 55, ISBN 978-0-549-30654-2
  4. Lange, O. 1942. Say's law: A restatement and criticism. In Lange, O., F. McIntyre, and T. O. Yntema, eds., Studies in Mathematical Economics and Econometrics, in Memory of Henry Schultz, pages 49–68. University of Chicago Press, Chicago.
  5. Florenzano, M. 1987. On an extension of the Gale–Nikaido–Debreu lemma. Economics Letters 25(1):51–53.
  6. Varian, Hal (1992). Microeconomic Analysis (Third ed.). New York: Norton. ISBN 0-393-95735-7.
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