- Source: Leontief production function
In economics, the Leontief production function or fixed proportions production function is a production function that implies the factors of production which will be used in fixed (technologically predetermined) proportions, as there is no substitutability between factors. It was named after Wassily Leontief and represents a limiting case of the constant elasticity of substitution production function.
For the simple case of a good that is produced with two inputs, the function is of the form
q
=
Min
(
z
1
a
,
z
2
b
)
{\displaystyle q={\text{Min}}\left({\frac {z_{1}}{a}},{\frac {z_{2}}{b}}\right)}
where q is the quantity of output produced, z1 and z2 are the utilised quantities of input 1 and input 2 respectively, and a and b are technologically determined constants.
Example
Suppose that the intermediate goods "tires" and "steering wheels" are used in the production of automobiles (for simplicity of the example, to the exclusion of anything else). Then in the above formula q refers to the number of automobiles produced, z1 refers to the number of tires used, and z2 refers to the number of steering wheels used. Assuming each car is produced with 4 tires and 1 steering wheel, the Leontief production function is
Number of cars = Min{1⁄4 times the number of tires, 1 times the number of steering wheels}.
See also
Cobb–Douglas production function
Isoquant
References
Allen, R. G. D. (1968). Macro-economic Theory: A Mathematical Treatment. London: Macmillan. p. 35.
Kata Kunci Pencarian:
- Robert M. Solow
- Leontief production function
- Production function
- Cobb–Douglas production function
- List of production functions
- Constant elasticity of substitution
- Generalized Ozaki cost function
- Input–output model
- Glossary of economics
- Kiel Institute for the World Economy
- Heckscher–Ohlin model
