Bond option


In finance, a bond option is an option to buy or sell a bond at a certain price on or before the option expiry date.^{[1]} These instruments are typically traded OTC.
 A European bond option is an option to buy or sell a bond at a certain date in future for a predetermined price.
 An American bond option is an option to buy or sell a bond on or before a certain date in future for a predetermined price.
Generally, one buys a call option on the bond if one believes that interest rates will fall, causing an increase in bond prices. Likewise, one buys the put option if one believes that interest rates will rise.^{[1]} One result of trading in a bond option, is that the price of the underlying bond is "locked in" for the term of the contract, thereby reducing the credit risk associated with fluctuations in the bond price.
Valuation[edit]
Bonds, the underlyers in this case, exhibit what is known as pulltopar: as the bond reaches its maturity date, all of the prices involved with the bond become known, thereby decreasing its volatility. On the other hand, the Black–Scholes model, which assumes constant volatility, does not reflect this process, and cannot therefore be applied here; [1] see Black–Scholes model #Valuing bond options.
Addressing this, bond options are usually valued using the Black model or with a latticebased shortrate model such as BlackDermanToy, HoLee or Hull–White. [2] The latter approach is theoretically more correct, [3], although in practice the Black Model is more widely used for reasons of simplicity and speed. For American and Bermudan styled options, where exercise is permitted prior to maturity, only the latticebased approach is applicable.
 Using the Black model, the spot price in the formula is not simply the market price of the underlying bond, rather it is the forward bond price. This forward price is calculated by first subtracting the present value of the coupons between the valuation date (i.e. today) and the exercise date from today's dirty price, and then forward valuing this amount to the exercise date. (These calculations are performed using today's yield curve, as opposed to the bond's YTM.) The reason that the Black Model may be applied in this way is that the numeraire is then $1 at the time of delivery (whereas under Black–Scholes, the numeraire is $1 today). This allows us to assume that (a) the bond price is a random variable at a future date, but also (b) that the riskfree rate between now and then is constant (since using the forward measure moves the discounting outside of the expectation term [4]). Thus the valuation takes place in a riskneutral "forward world" where the expected future spot rate is the forward rate, and its standard deviation is the same as in the "physical world"; [5] see Girsanov's theorem. The volatility used, is typically "readoff" an Implied volatility surface.
 The latticebased model entails a tree of short rates – a zeroeth step – consistent with today's yield curve and short rate (often caplet) volatility, and where the final time step of the tree corresponds to the date of the underlying bond's maturity. Using this tree (1) the bond is valued at each node by "stepping backwards" through the tree: at the final nodes, bond value is simply face value (or $1), plus coupon (in cents) if relevant; at each earlier node, it is the discounted expected value of the up and downnodes in the later time step, plus coupon payments during the current time step. Then (2), the option is valued similar to the approach for equity options: at nodes in the timestep corresponding to option maturity, value is based on moneyness; at earlier nodes, it is the discounted expected value of the option at the up and downnodes in the later time step, and, depending on option style (and other specifications – see below), of the bond value at the node. [6] [7] For both steps, the discounting is at the short rate for the treenode in question. (Note that the HullWhite tree is usually Trinomial: the logic is as described, although there are then three nodes in question at each point.) See Lattice model (finance)#Interest rate derivatives.
Embedded options[edit]
The term "bond option" is also used for optionlike features of some bonds ("embedded options"). These are an inherent part of the bond, rather than a separately traded product. These options are not mutually exclusive, so a bond may have several options embedded. [8] Bonds of this type include:
 Callable bond: allows the issuer to buy back the bond at a predetermined price at a certain time in future. The holder of such a bond has, in effect, sold a call option to the issuer. Callable bonds cannot be called for the first few years of their life. This period is known as the lock out period.
 Puttable bond: allows the holder to demand early redemption at a predetermined price at a certain time in future. The holder of such a bond has, in effect, purchased a put option on the bond.
 Convertible bond: allows the holder to demand conversion of bonds into the stock of the issuer at a predetermined price at a certain time period in future.
 Extendible bond: allows the holder to extend the bond maturity date by a number of years.
 Exchangeable bond: allows the holder to demand conversion of bonds into the stock of a different company, usually a public subsidiary of the issuer, at a predetermined price at certain time period in future.
Callable and putable bonds can be valued using the latticebased approach, as above, but additionally allowing that the effect of the embedded option is incorporated at each node in the tree, impacting the bond price and / or the option price as specified. [9] These bonds are also sometimes valued using Black–Scholes. Here, the bond is priced as a "straight bond" (i.e. as if it had no embedded features) and the option is valued using the Black Scholes formula. The option value is then added to the straight bond price if the optionality rests with the buyer of the bond; it is subtracted if the seller of the bond (i.e. the issuer) may choose to exercise. [10] [11] [12]^{[permanent dead link]} For convertible and exchangeable bonds, a more sophisticated approach is to model the instrument as a "coupled system" comprising an equity component and a debt component, each with different default risks; see Lattice model (finance)#Hybrid securities.
Relationship with caps and floors[edit]
European Put options on zero coupon bonds can be seen to be equivalent to suitable caplets, i.e. interest rate cap components, whereas call options can be seen to be equivalent to suitable floorlets, i.e. components of interest rate floors. See for example Brigo and Mercurio (2001), who also discuss bond options valuation with different models.
References[edit]
 Black, F.; Derman, E.; Toy, W. (January–February 1990). "A OneFactor Model of Interest Rates and Its Application to Treasury Bond Options" (PDF). Financial Analysts Journal: 24–32. Archived from the original (PDF) on 20080910.
 Damiano Brigo and Fabio Mercurio (2001). Interest Rate Models  Theory and Practice with Smile, Inflation and Credit (2nd ed. 2006 ed.). Springer Verlag. ISBN 9783540221494.
 Aswath Damodaran (2002). Investment Valuation (2nd ed.). John Wiley. ISBN 0471414883., Chapter 33: Valuing Fixed Income Securities
 Frank Fabozzi (1998). Valuation of fixed income securities and derivatives (3rd ed.). John Wiley. ISBN 9781883249250.
 R. Stafford Johnson (2010). Bond Evaluation, Selection, and Management (2nd ed.). John Wiley. ISBN 0470478357.
 David F. Babbel (1996). Valuation of InterestSensitive Financial Instruments: SOA Monograph MFI961 (1st ed.). John Wiley & Sons. ISBN 9781883249151.
External links[edit]
 Discussion
 Bond Options, Caps and the Black Model, Milica Cudina, University of Texas at Austin
 Valuing Bonds with Embedded Options^{[permanent dead link]}, Frank J. Fabozzi
 Valuing Convertible Bonds as Derivatives, Goldman Sachs (authors include Emanuel Derman and Piotr Karasinski)
 The Valuation and Calibration of Convertible Bonds, Sanveer Hariparsad, University of Pretoria
 Martingales and Measures: Black's Model, Jacqueline HennOverbeck, University of Basel
 Binomial Interest Rate Trees and the Valuation of Bonds with Embedded Options, Stafford Johnson, Xavier University
 The Problem with Black, Scholes et al., Andrew Kalotay
 Methods of Pricing Convertible Bonds, Ariel Zadikov, University of Cape Town
Online tools
 Black Bond Option Model, Dr. Thomas Ho, thomasho.com
 Bond Option Pricing using the Black Model Dr. Shing Hing Man, ThomsonReuters' Risk Management
 Pricing A Bond Using the BDT Model Dr. Shing Hing Man, ThomsonReuters' Risk Management
 'Greeks' Calculator using the Black model, Dr. Razvan Pascalau, SUNY Plattsburgh
 Pricing Bond Option using G2++ model, pricingoption.com