Rachlin, H.. (2006).
Notes on discounting.
Journal of the Experimental Analysis of Behavior, 85, 425-
435.
In general, if a variable can be expressed as a function of its own maximum value,
that function may be called a discount function. Delay discounting and probability
discounting are commonly studied in psychology, but memory, matching, and economic
utility also may be viewed as discounting processes. When they are so viewed, the
discount function obtained is hyperbolic in form. In some cases the effective
discounting variable is proportional to the physical variable on which it is based.
For example, in delay discounting, the physical variable, delay (D), may enter into
the hyperbolic equation as kD. In many cases, however, the discounting data are not
well described with a single-parameter discount function. A much better fit is obtained
when the effective variable is a power function of the physical variable (kDs in the
case of delay discounting). This power-function form fits the data of delay, probability,
and memory discounting as well as other two-parameter discount fu!
nctions and is consistent with both the generalized matching law and maximization of a
constant-elasticity-of-substitution utility function.
Key words: discounting, delay discounting, memory discounting, social discounting, probability discounting, matching, rational behavior, utility maximization