Job Matching
   HOME

TheInfoList



OR:

In economics, search and matching theory, is a mathematical framework attempting to describe the formation of mutually beneficial relationships over time. It is closely related to
stable matching theory In economics, stable matching theory or simply matching theory, is the study of matching markets. Matching markets are distinguished from Walrasian markets in the focus of who matches with whom. Matching theory typically examines matching in th ...
. Search and matching theory has been especially influential in labor economics, where it has been used to describe the formation of new jobs. Search and matching theory evolved from an earlier framework called ' search theory'. Where search theory studies the
microeconomic Microeconomics is a branch of mainstream economics that studies the behavior of individuals and firms in making decisions regarding the allocation of scarce resources and the interactions among these individuals and firms. Microeconomics fo ...
decision of an individual searcher, search and matching theory studies the macroeconomic outcome when one or more types of searchers interact. It offers a way of modeling markets in which frictions prevent instantaneous adjustments of the level of economic activity. Among other applications, it has been used as a framework for studying
frictional unemployment Frictional unemployment is a form of unemployment reflecting the gap between someone voluntarily leaving a job and finding another. As such, it is sometimes called search unemployment, though it also includes gaps in employment when transferring ...
. One of the founders of search and matching theory is Dale T. Mortensen of Northwestern University. A textbook treatment of the matching approach to labor markets is Christopher A. Pissarides' book ''Equilibrium Unemployment Theory''. Mortensen and Pissarides, together with
Peter A. Diamond Peter Arthur Diamond (born , 1940) is an American economist known for his analysis of U.S. Social Security policy and his work as an advisor to the Advisory Council on Social Security in the late 1980s and 1990s. He was awarded the Nobel Memoria ...
, were awarded the 2010 Nobel Prize in Economics for 'fundamental contributions to search and matching theory'.


The matching function

A matching function is a mathematical relationship that describes the formation of new relationships (also called 'matches') from unmatched agents of the appropriate types. For example, in the context of job formation, matching functions are sometimes assumed to have the following ' Cobb–Douglas' form: :m_t \; = \; M(u_t,v_t) \; = \; \mu u_t^a v_t^b where \,\mu\,, \,a\,, and \,b\, are positive constants. In this equation, \,u_t\, represents the number of unemployed job seekers in the economy at a given time \,t\,, and \,v_t\, is the number of vacant jobs firms are trying to fill. The number of new relationships (matches) created (per unit of time) is given by \,m_t\,. A matching function is in general analogous to a production function. But whereas a production function usually represents the production of goods and services from inputs like labor and capital, a matching function represents the formation of new relationships from the pools of available unmatched individuals. Estimates of the labor market matching function suggest that it has constant returns to scale, that is, a+b\approx 1. If the fraction of jobs that separate (due to firing, quits, and so forth) from one period to the next is \,\delta\,, then to calculate the change in employment from one period to the next we must add the formation of new matches and subtract off the separation of old matches. A period may be treated as a week, a month, a quarter, or some other convenient period of time, depending on the data under consideration. (For simplicity, we are ignoring the entry of new workers into the labor force, and death or retirement of old workers, but these issues can be accounted for as well.) Suppose we write the number of workers employed in period \,t\, as \,n_t=L_t-u_t\,, where \,L_t\, is the labor force in period \,t\,. Then given the matching function described above, the dynamics of employment over time would be given by :n_ \; = \mu u_t^a v_t^b + (1-\delta)n_t For simplicity, many studies treat \,\delta\, as a fixed constant. But the fraction of workers separating per period of time can be determined endogenously if we assume that the value of being matched varies over time for each worker-firm pair (due, for example, to changes in
productivity Productivity is the efficiency of production of goods or services expressed by some measure. Measurements of productivity are often expressed as a ratio of an aggregate output to a single input or an aggregate input used in a production proces ...
).


Applications

Matching theory has been applied in many economic contexts, including: *Formation of jobs, from unemployed workers and vacancies opened by firms *Allocation of loans from banks to entrepreneurs *The role of money in facilitating sales when sellers and buyers meet


Controversy

Matching theory has been widely accepted as one of the best available descriptions of the frictions in the labor market, but some economists have recently questioned its quantitative accuracy. While unemployment exhibits large fluctuations over the business cycle,
Robert Shimer Robert Shimer (born August 21, 1968) is an American macroeconomist and labor economist who currently holds the Alvin H. Baum Chair in the Economics Department of the University of Chicago. He was an editor of the ''Journal of Political Economy ...
has demonstrated that standard versions of matching models predict much smaller fluctuations in unemployment.


See also

* Search theory * Beveridge curve * Labor economics * Monetary economics * Nash bargaining game * Matching (graph theory) * Optimal matching


References

{{Economics Labour economics Microeconomic theories Mathematical and quantitative methods (economics)