In
mathematical finance
Mathematical finance, also known as quantitative finance and financial mathematics, is a field of applied mathematics, concerned with mathematical modeling in the financial field.
In general, there exist two separate branches of finance that req ...
, a replicating portfolio for a given asset or series of cash flows 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 ...
of assets with the same properties (especially cash flows). This is meant in two distinct senses: static replication, where the portfolio has the same cash flows as the reference asset (and no changes need to be made to maintain this), and dynamic replication, where the portfolio does not have the same cash flows, but has the same "
Greeks
Greeks or Hellenes (; , ) are an ethnic group and nation native to Greece, Greek Cypriots, Cyprus, Greeks in Albania, southern Albania, Greeks in Turkey#History, Anatolia, parts of Greeks in Italy, Italy and Egyptian Greeks, Egypt, and to a l ...
" as the reference asset, meaning that for small (properly,
infinitesimal
In mathematics, an infinitesimal number is a non-zero quantity that is closer to 0 than any non-zero real number is. The word ''infinitesimal'' comes from a 17th-century Modern Latin coinage ''infinitesimus'', which originally referred to the " ...
) changes to underlying market parameters, the price of the asset and the price of the portfolio change in the same way. Dynamic replication requires continual adjustment, as the asset and portfolio are only assumed to behave similarly at a single point (mathematically, their partial derivatives are equal at a single point).
Given an asset or liability, an offsetting replicating portfolio (a "
hedge
A hedge or hedgerow is a line of closely spaced (3 feet or closer) shrubs and sometimes trees, planted and trained to form a barrier or to mark the boundary of an area, such as between neighbouring properties. Hedges that are used to separate ...
") is called a static hedge or dynamic hedge, and constructing such a portfolio (by selling or purchasing) is called static hedging or dynamic hedging. The notion of a replicating portfolio is fundamental to
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 assu ...
, which assumes that market prices are
arbitrage-free
Arbitrage (, ) is the practice of taking advantage of a difference in prices in two or more marketsstriking a combination of matching deals to capitalize on the difference, the profit being the difference between the market prices at which the ...
– concretely, arbitrage opportunities are exploited by constructing a replicating portfolio.
In practice, replicating portfolios are seldom, if ever, ''exact'' replications. Most significantly, unless they are claims against the same
counterparties, there is
credit risk
Credit risk is the chance that a borrower does not repay a loan
In finance, a loan is the tender of money by one party to another with an agreement to pay it back. The recipient, or borrower, incurs a debt and is usually required to pay ...
. Further, dynamic replication is invariably imperfect, since actual price movements are not infinitesimal – they may in fact be large – and transaction costs to change the hedge are not zero.
Applications
Derivatives pricing
Dynamic replication is fundamental to the
Black–Scholes model
The Black–Scholes or Black–Scholes–Merton model is a mathematical model for the dynamics of a financial market containing Derivative (finance), derivative investment instruments. From the parabolic partial differential equation in the model, ...
of
derivatives pricing
In finance, a derivative is a contract between a buyer and a seller. The derivative can take various forms, depending on the transaction, but every derivative has the following four elements:
# an item (the "underlier") that can or must be bou ...
, which assumes that derivatives can be replicated by portfolios of other securities, and thus their prices determined. See explication under
Rational pricing #The replicating portfolio.
In limited cases static replication is sufficient, notably in
put–call parity
In financial mathematics, the put–call parity defines a relationship between the price of a European call option and European put option, both with the identical strike price and expiry, namely that a portfolio of a long call option and a shor ...
.
An important technical detail is how cash is treated. Most often one considers a
self-financing portfolio
In financial mathematics, a self-financing portfolio is a portfolio having the feature that, if there is no
exogenous infusion or withdrawal of money, the purchase of a new asset must be financed by the sale of an old one. This concept is used to ...
, where any required cash (such as for premium payments) is borrowed, and excess cash is loaned.
Insurance
In the valuation of a
life insurance
Life insurance (or life assurance, especially in the Commonwealth of Nations) is a contract
A contract is an agreement that specifies certain legally enforceable rights and obligations pertaining to two or more parties. A contract typical ...
company, the
actuary
An actuary is a professional with advanced mathematical skills who deals with the measurement and management of risk and uncertainty. These risks can affect both sides of the balance sheet and require investment management, asset management, ...
considers a series of future uncertain cashflows (including incoming premiums and outgoing claims, for example) and attempts to put a value on these cashflows. There are many ways of calculating such a value (such as a
net premium valuation
A net premium valuation is an actuarial calculation, used to place a value on the liabilities of a life insurer.
Background
It involves calculating a present value for the contractual liabilities of a contract, and deducting the value of future ...
), but these approaches are often arbitrary in that the interest rate chosen for
discounting
In finance, discounting is a 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", "Effici ...
is itself arbitrarily chosen.
One possible approach, and one that is gaining increasing attention, is the use of ''replicating portfolios'' or ''hedge portfolios''. The theory is that a portfolio of assets (fixed interest bonds, zero coupon bonds, index-linked bonds, etc.) can be selected with cashflows identical to the magnitude and the timing of the cashflows to be valued.
For example, suppose the cash flows over a 7-year period are, respectively, $2, $2, $2, $50, $2, $2, $102. One could buy a $100 seven-year bond with a 2% annual coupon, and a four-year
zero-coupon bond
A zero-coupon bond (also discount bond or deep discount bond) is a bond in which the face value is repaid at the time of maturity. Unlike regular bonds, it does not make periodic interest payments or have so-called coupons, hence the term zer ...
with a maturity value of 48. The market price of those two instruments (that is, the cost of buying this simple replicating portfolio) might be $145 – and therefore the value of the cashflows is also taken to be $145 (as opposed to the face value of the total cash flows at the conclusion of the 7 years, which is $162). Such a construction, which requires only fixed-income securities, is even possible for
participating contracts (at least when bonuses are based on the performance of the backing assets). The proof relies on a fixed point argument.
Advantages of a static replicating portfolio approach include:
* an arbitrary discount rate is not required.
* the term structure of interest rates is automatically taken into account.
Valuing options and guarantees can require complex nested stochastic calculations. Replicating portfolios can be set up to replicate such options and guarantees. It may be easier to value the replicating portfolio than to value the underlying feature (options and guarantees).
For example, bonds and equities can be used to replicate a call option. The call option can then be easily valued as the value of the bond/equity portfolio, hence not requiring one to value the call option directly.
References
{{reflist
External linksThe Economics of Insurance: economic valuations and replicating portfolios
Pricing
Portfolio theories
Actuarial science
Arbitrage
Financial economics