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"Financial ...
, asset pricing refers to a formal treatment and development of two main
pricing principles, outlined below, together with the resultant models.
There have been many models developed for different situations, but correspondingly, these stem from either
general equilibrium asset pricing or
rational asset pricing, the latter corresponding to risk neutral pricing.
Investment theory, which is near synonymous, encompasses the body of knowledge used to support the
decision-making
In psychology, decision-making (also spelled decision making and decisionmaking) is regarded as the Cognition, cognitive process resulting in the selection of a belief or a course of action among several possible alternative options. It could be ...
process of choosing
investment
Investment is the dedication of money to purchase of an asset to attain an increase in value over a period of time. Investment requires a sacrifice of some present asset, such as time, money, or effort.
In finance, the purpose of investing i ...
s,
and the asset pricing models are then applied in determining the
asset-specific required rate of return on the investment in question, or in pricing derivatives on these, for trading or
hedging.
(See also .)
General Equilibrium Asset Pricing
Under
General equilibrium theory
In economics, general equilibrium theory attempts to explain the behavior of supply, demand, and prices in a whole economy with several or many interacting markets, by seeking to prove that the interaction of demand and supply will result in an ov ...
prices are determined through
market pricing by
supply and demand
In microeconomics, supply and demand is an economic model of price determination in a Market (economics), market. It postulates that, Ceteris paribus, holding all else equal, in a perfect competition, competitive market, the unit price for a ...
. Here asset prices jointly satisfy the requirement that the quantities of each asset supplied and the quantities demanded must be equal at that price - so called
market clearing
In economics, market clearing is the process by which, in an economic market, the supply of whatever is traded is equated to the demand so that there is no excess supply or demand. The new classical economics assumes that in any given market, assum ...
. These models are born out of
modern portfolio theory
Modern portfolio theory (MPT), or mean-variance analysis, is a mathematical framework for assembling a portfolio of assets such that the expected return is maximized for a given level of risk. It is a formalization and extension of diversificatio ...
, with the
capital asset pricing model
In finance, the capital asset pricing model (CAPM) is a model used to determine a theoretically appropriate required rate of return of an asset, to make decisions about adding assets to a well-diversified portfolio.
The model takes into accou ...
(CAPM) as the prototypical result. Prices here are determined with reference to macroeconomic variables - for the CAPM, the "overall market"; for the
CCAPM, overall wealth - such that individual preferences are subsumed.
These models aim at modeling the statistically derived probability distribution of the market prices of "all" securities at a given future investment horizon; they are thus of "large dimension". See
§ Risk and portfolio management: the P world under
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 ...
.
General equilibrium pricing is then used when evaluating diverse portfolios, creating one asset price for many assets.
Calculating an investment or share value here, entails:
(i) a
financial forecast
A financial forecast is an estimate of future financial outcomes for a company or project, usually applied in budgeting, capital budgeting and / or valuation; see .
Depending on context the term may also refer to listed company (quarterly) ea ...
for the business or project in question;
(ii) where the
output cashflows are then
discounted
Discounting is a financial mechanism in which a debtor obtains the right to delay payments to a creditor, for a defined period of time, in exchange for a charge or fee.See "Time Value", "Discount", "Discount Yield", "Compound Interest", "Efficient ...
at the rate returned by the model selected; this rate in turn reflecting the "riskiness" - i.e. the
idiosyncratic
An idiosyncrasy is an unusual feature of a person (though there are also other uses, see below). It can also mean an odd habit. The term is often used to express eccentricity or peculiarity. A synonym may be "quirk".
Etymology
The term "idiosyncr ...
, or
undiversifiable risk - of these cashflows;
(iii) these present values are then aggregated, returning the value in question.
See: , and
Valuation using discounted cash flows
Valuation using discounted cash flows (DCF valuation) is a method of estimating the current value of a company based on projected future cash flows adjusted for the time value of money.
The cash flows are made up of those within the “explicit� ...
.
(Note that an alternate, although less common approach, is to apply a "fundamental valuation" method, such as the
T-model, which instead relies on accounting information, attempting to model return based on the company's expected financial performance.)
Rational Pricing
Under
Rational pricing
Rational pricing is the assumption in financial economics that asset prices - and hence asset pricing models - will reflect the arbitrage-free price of the asset as any deviation from this price will be "arbitraged away". This assumption is use ...
, (usually)
derivative prices are calculated such that they are
arbitrage
In economics and finance, arbitrage (, ) is the practice of taking advantage of a difference in prices in two or more markets; striking a combination of matching deals to capitalise on the difference, the profit being the difference between the ...
-free with respect to
more fundamental (equilibrium determined) securities prices;
for an overview of the logic see .
In general this approach does not group assets but rather creates a unique risk price for each asset; these models are then of "low dimension".
For further discussion, see
§ Derivatives pricing: the Q world under Mathematical finance.
Calculating option prices (or their
"Greeks") combines:
(i) a model of the underlying price behavior, or "
process
A process is a series or set of activities that interact to produce a result; it may occur once-only or be recurrent or periodic.
Things called a process include:
Business and management
*Business process, activities that produce a specific se ...
" - ie the asset pricing model selected;
and
(ii) a
mathematical method which returns the premium (or sensitivity) as the
expected value
In probability theory, the expected value (also called expectation, expectancy, mathematical expectation, mean, average, or first moment) is a generalization of the weighted average. Informally, the expected value is the arithmetic mean of a l ...
of option payoffs over the range of prices of the underlying.
See .
The classical model here is
Black–Scholes which describes the dynamics of a market including derivatives (with its
option pricing formula); leading more generally to
Martingale pricing Martingale pricing is a pricing approach based on the notions of martingale and risk neutrality. The martingale pricing approach is a cornerstone of modern quantitative finance and can be applied to a variety of derivatives contracts, e.g. options ...
, as well as the aside models. Black–Scholes assumes a
log-normal
In probability theory, a log-normal (or lognormal) distribution is a continuous probability distribution of a random variable whose logarithm is normally distributed. Thus, if the random variable is log-normally distributed, then has a normal ...
process; the other models will, for example, incorporate features such as
mean reversion, or will be "
volatility surface
Volatility smiles are implied volatility patterns that arise in pricing financial options. It is a parameter (implied volatility) that is needed to be modified for the Black–Scholes formula to fit market prices. In particular for a given exp ...
aware", applying
local volatility A local volatility model, in mathematical finance and financial engineering, is an option pricing model that treats volatility as a function of both the current asset level S_t and of time t . As such, it is a generalisation of the Black–Sch ...
or
stochastic volatility
In statistics, stochastic volatility models are those in which the variance of a stochastic process is itself randomly distributed. They are used in the field of mathematical finance to evaluate derivative securities, such as options. The name ...
.
Rational pricing is also applied to fixed income instruments such as bonds (that consist of just one asset), as well as to interest rate modeling in general, where
yield curves must be arbitrage free
with respect to the prices of individual instruments.
See ,
Bootstrapping (finance) In finance, bootstrapping is a method for constructing a ( zero-coupon) fixed-income yield curve from the prices of a set of coupon-bearing products, e.g. bonds and swaps.
A ''bootstrapped curve'', correspondingly, is one where the prices of the ...
,
Multi-curve framework
In finance, an interest rate swap (IRS) is an interest rate derivative (IRD). It involves exchange of interest rates between two parties. In particular it is a "linear" IRD and one of the most liquid, benchmark products. It has associations with ...
.
As regards options on these instruments, and other
interest rate derivative
In finance, an interest rate derivative (IRD) is a derivative whose payments are determined through calculation techniques where the underlying benchmark product is an interest rate, or set of different interest rates. There are a multitude of diff ...
s, see
short-rate model
A short-rate model, in the context of interest rate derivatives, is a mathematical model that describes the future evolution of interest rates by describing the future evolution of the short rate, usually written r_t \,.
The short rate
Under a sh ...
and
Heath–Jarrow–Morton framework The Heath–Jarrow–Morton (HJM) framework is a general framework to model the evolution of interest rate curves – instantaneous forward rate curves in particular (as opposed to simple forward rates). When the volatility and drift of the in ...
for discussion as to how the various models listed above are applied.
Interrelationship
These principles are interrelated through the
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 ...
.
Here, "in the absence of arbitrage, the market imposes a probability distribution, called a risk-neutral or equilibrium measure, on the set of possible market scenarios, and... this probability measure determines market prices via discounted expectation".
[Steven Lalley]
The Fundamental Theorem of Asset Pricing
(course notes). University of Chicago
The University of Chicago (UChicago, Chicago, U of C, or UChi) is a private research university in Chicago, Illinois. Its main campus is located in Chicago's Hyde Park neighborhood. The University of Chicago is consistently ranked among the b ...
.
Correspondingly, this essentially means that one may make financial decisions, using the risk neutral probability distribution consistent with (i.e. solved for) observed equilibrium prices. See .
Related articles
*
List of financial economics articles
*
References
Financial economics
Asset
Pricing
Financial models
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