Stochastic Discount Factor
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The concept of the stochastic discount factor (SDF) is used in
financial economics Financial economics, also known as finance, is the branch of economics characterized by a "concentration on monetary activities", in which "money of one type or another is likely to appear on ''both sides'' of a trade". William F. Sharpe"Financia ...
and
mathematical finance Mathematical finance, also known as quantitative finance and financial mathematics, is a field of applied mathematics, concerned with mathematical modeling of financial markets. In general, there exist two separate branches of finance that require ...
. The name derives from the price of an asset being computable by "discounting" the future cash flow \tilde_i by the stochastic factor \tilde, and then taking the expectation. This definition is of fundamental importance in
asset pricing In financial economics, asset pricing refers to a formal treatment and development of two main Price, pricing principles, outlined below, together with the resultant models. There have been many models developed for different situations, but cor ...
. If there are ''n'' assets with initial prices p_1, \ldots, p_n at the beginning of a period and payoffs \tilde_1, \ldots, \tilde_n at the end of the period (all ''x''s are random (stochastic) variables), then SDF is any random variable \tilde satisfying :E(\tilde\tilde_i) = p_i, \text i=1,\ldots,n. The stochastic discount factor is sometimes referred to as the pricing kernel as, if the expectation E(\tilde\,\tilde_i) is written as an integral, then \tilde can be interpreted as the kernel function in an
integral transform In mathematics, an integral transform maps a function from its original function space into another function space via integration, where some of the properties of the original function might be more easily characterized and manipulated than in ...
. Other names sometimes used for the SDF are the "
marginal rate of substitution In economics, the marginal rate of substitution (MRS) is the rate at which a consumer can give up some amount of one good in exchange for another good while maintaining the same level of utility. At equilibrium consumption levels (assuming no exte ...
" (the ratio of
utility As a topic of economics, utility is used to model worth or value. Its usage has evolved significantly over time. The term was introduced initially as a measure of pleasure or happiness as part of the theory of utilitarianism by moral philosopher ...
of states, when utility is separable and additive, though discounted by the risk-neutral rate), a "change of measure", " state-price deflator" or a "state-price density".


Properties

The existence of an SDF is equivalent to the
law of one price The law of one price (LOOP) states that in the absence of trade frictions (such as transport costs and tariffs), and under conditions of free competition and price flexibility (where no individual sellers or buyers have power to manipulate prices ...
; similarly, the existence of a strictly positive SDF is equivalent to the absence of arbitrage opportunities (see
Fundamental theorem of asset pricing The fundamental theorems of asset pricing (also: of arbitrage, of finance), in both financial economics and mathematical finance, provide necessary and sufficient conditions for a market to be arbitrage-free, and for a market to be complete. An ...
). This being the case, then if p_i is positive, by using \tilde_i = \tilde_i / p_i to denote the return, we can rewrite the definition as :E(\tilde\tilde_i) = 1, \quad \forall i, and this implies :E \left \tilde (\tilde_i - \tilde_j)\right= 0, \quad \forall i,j. Also, if there is a
portfolio Portfolio may refer to: Objects * Portfolio (briefcase), a type of briefcase Collections * Portfolio (finance), a collection of assets held by an institution or a private individual * Artist's portfolio, a sample of an artist's work or a ...
made up of the assets, then the SDF satisfies :E(\tilde\tilde) = p, \quad E(\tilde\tilde) = 1. By a simple standard identity on
covariance In probability theory and statistics, covariance is a measure of the joint variability of two random variables. If the greater values of one variable mainly correspond with the greater values of the other variable, and the same holds for the les ...
s, we have :1 = \operatorname (\tilde, \tilde) + E(\tilde) E(\tilde). Suppose there is a risk-free asset. Then \tilde = R_f implies E(\tilde) = 1/R_f. Substituting this into the last expression and rearranging gives the following formula for the
risk premium A risk premium is a measure of excess return that is required by an individual to compensate being subjected to an increased level of risk. It is used widely in finance and economics, the general definition being the expected risky return less t ...
of any asset or portfolio with return \tilde: :E(\tilde) - R_f = -R_f \operatorname (\tilde, \tilde). This shows that risk premiums are determined by covariances with any SDF.


See also

Hansen–Jagannathan bound Hansen–Jagannathan bound is a theorem in financial economics that says that the ratio of the standard deviation of a stochastic discount factor to its mean exceeds the Sharpe ratio attained by any portfolio. This result applies, among others, th ...


References

{{reflist Stochastic calculus Financial economics Mathematical finance