A barrier option is an option whose payoff is conditional upon the underlying asset's price breaching a barrier level during the option's lifetime.
Types
Barrier options are path-dependent
exotic
Exotic may refer to:
Mathematics and physics
* Exotic R4, a differentiable 4-manifold, homeomorphic but not diffeomorphic to the Euclidean space R4
*Exotic sphere, a differentiable ''n''-manifold, homeomorphic but not diffeomorphic to the ordinar ...
s that are similar in some ways to ordinary
options
Option or Options may refer to:
Computing
*Option key, a key on Apple computer keyboards
*Option type, a polymorphic data type in programming languages
*Command-line option, an optional parameter to a command
*OPTIONS, an HTTP request method
...
. You can
call
Call or Calls may refer to:
Arts, entertainment, and media Games
* Call, a type of betting in poker
* Call, in the game of contract bridge, a bid, pass, double, or redouble in the bidding stage
Music and dance
* Call (band), from Lahore, Paki ...
or
put in
American
American(s) may refer to:
* American, something of, from, or related to the United States of America, commonly known as the "United States" or "America"
** Americans, citizens and nationals of the United States of America
** American ancestry, pe ...
,
Bermudan, or
European exercise style. But they become activated (or extinguished) only if the underlying breaches a predetermined level (the barrier).
"In" options only become active in the event that a predetermined knock-in barrier price is breached:
# If the barrier price is far from being breached, the knock-in option will be worth slightly more than zero.
# If the barrier price is close to being breached, the knock-in option will be worth slightly less than the corresponding vanilla option.
# If the barrier price has been breached, the knock-in option will trade at the exact same value as the corresponding vanilla option.
"Out" options start their lives active and become null and void in the event that a certain knock-out barrier price is breached:
# If the barrier price is far from being breached, the knock-out option will be slightly less than the corresponding vanilla option.
# If the barrier price is close to being breached, the knock-out option will be worth slightly more than zero.
# If the barrier price has been breached, the knock-out option will trade at the exact value of zero.
Some variants of "Out" options compensate the owner for the knock-out by paying a cash fraction of the premium at the time of the breach.
The four main types of barrier options are:
*Up-and-out: spot price starts below the barrier level and has to move up for the option to be knocked out.
*Down-and-out: spot price starts above the barrier level and has to move down for the option to become null and void.
*Up-and-in: spot price starts below the barrier level and has to move up for the option to become activated.
*Down-and-in: spot price starts above the barrier level and has to move down for the option to become activated.
For example, a European call option may be written on an underlying with spot price of $100 and a knockout barrier of $120. This option behaves in every way like a vanilla European call, except if the spot price ever moves above $120, the option "knocks out" and the contract is null and void. Note that the option does not reactivate if the spot price falls below $120 again.
By in-out parity, we mean that the combination of one "in" and one "out" barrier option with the same strikes and expirations yields the price of the corresponding vanilla option:
. Note that before the knock-in/out event, both options have positive value, and hence both are strictly valued below the corresponding vanilla option. After the knock-in/out event, the knock-out option is worthless and the knock-in option's value coincides with that of the corresponding vanilla option. At maturity, exactly one of the two will pay off identically to the corresponding vanilla option, which of the two that depends on whether the knock-in/out event has occurred before maturity.
Barrier events
A ''barrier event'' occurs when the underlying crosses the barrier level. While it seems straightforward to define a barrier event as "underlying trades at or above a given level," in reality it's not so simple. What if the underlying only trades at the level for a single trade? How big would that trade have to be? Would it have to be on an exchange or could it be between private parties? When barrier options were first introduced to options markets, many banks had legal trouble resulting from a mismatched understanding with their counterparties regarding exactly what constituted a barrier event.
Variations
Barrier options are sometimes accompanied by a ''rebate'', which is a payoff to the option holder in case of a barrier event. Rebates can either be paid at the time of the event or at expiration.
*A ''discrete barrier'' is one for which the barrier event is considered at discrete times, rather than the normal ''continuous barrier'' case.
*A ''Parisian option'' is a barrier option where the barrier condition applies only once the price of the underlying instrument has spent at least a given period of time on the wrong side of the barrier.
*A ''
turbo warrant
A turbo warrant (or callable bull/bear contract) is a kind of stock option. Specifically, it is a barrier option of the down and out type. It is similar to a vanilla contract, but with two additional features: It has a low vega, meaning that t ...
'' is a barrier option namely a knock out call that is initially in the money and with the barrier at the same level as the strike.
Barrier options can have either
American
American(s) may refer to:
* American, something of, from, or related to the United States of America, commonly known as the "United States" or "America"
** Americans, citizens and nationals of the United States of America
** American ancestry, pe ...
,
Bermudan or
European exercise style.
Valuation
The valuation of barrier options can be tricky, because unlike other simpler options they are path-dependent – that is, the value of the option at any time depends not just on the underlying at that point, but also on the ''path'' taken by the underlying (since, if it has crossed the barrier, a barrier event has occurred). Although the classical
Black–Scholes approach does not directly apply, several more complex methods can be used:
* The simplest way to value barrier options is to use a static
replicating portfolio In mathematical finance, a replicating portfolio for a given asset or series of cash flows is a portfolio of assets with the same properties (especially cash flows). This is meant in two distinct senses: static replication, where the portfolio has ...
of vanilla options (which can be valued with
Black–Scholes), chosen so as to mimic the value of the barrier at expiry and at selected discrete points in time along the barrier. This approach was pioneered by Peter Carr and gives closed form prices and replication strategies for all types of barrier options, but usually only by assuming that the Black-Scholes model is correct. This method is therefore inappropriate when there is a
volatility smile
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 expi ...
. For a more general but similar approach that uses numerical methods, see Derman's "Static Options Replication."
* Another approach is to study the law of the maximum (or minimum) of the underlying. This approach gives explicit (closed form) prices to barrier options.
* Yet another method is the
partial differential equation
In mathematics, a partial differential equation (PDE) is an equation which imposes relations between the various partial derivatives of a multivariable function.
The function is often thought of as an "unknown" to be solved for, similarly to h ...
(PDE) approach. The PDE satisfied by an ''out'' barrier options is the same one satisfied by a vanilla option under Black and Scholes assumptions, with extra
boundary condition
In mathematics, in the field of differential equations, a boundary value problem is a differential equation together with a set of additional constraints, called the boundary conditions. A solution to a boundary value problem is a solution to th ...
s demanding that the option become worthless when the underlying touches the barrier.
* When an exact formula is difficult to obtain, barrier options can be priced with the
Monte Carlo option model In mathematical finance, a Monte Carlo option model uses Monte Carlo methodsAlthough the term 'Monte Carlo method' was coined by Stanislaw Ulam in the 1940s, some trace such methods to the 18th century French naturalist Buffon, and a question he as ...
. However, computing the
Greeks
The Greeks or Hellenes (; el, Έλληνες, ''Éllines'' ) are an ethnic group and nation indigenous to the Eastern Mediterranean and the Black Sea regions, namely Greece, Cyprus, Albania, Italy, Turkey, Egypt, and, to a lesser extent, ot ...
(sensitivities) using this approach is numerically unstable.
* A faster approach is to use
Finite difference methods for option pricing to
diffuse
Diffusion is the net movement of anything (for example, atoms, ions, molecules, energy) generally from a region of higher concentration to a region of lower concentration. Diffusion is driven by a gradient in Gibbs free energy or chemical p ...
the PDE backwards from the boundary condition (which is the terminal payoff at expiry, plus the condition that the value along the barrier is always 0 at any time). Both
explicit finite-differencing methods and the
Crank–Nicolson scheme have their advantages.
* A simple approach of binomial tree option pricing also applies.
References
{{Derivatives market
Options (finance)