Hi guys, I thought that you might have faced with such a problem in the past and you’ll be able to give me some tips. I’m having a problem with pricing of an exotic contract which looks like an option with the following name: moving-strike barrier american option. The strike depends on the asset price on the market and the LIBOR rates.
Because this is OTC product, there are some non-trivial features here, naming the option buyer have the right to buy the underlying asset in a particular period of time, but if he won’t exercise it before the maturity (let’s call that maturity A), the option seller will then gain an option to sell it to the buyer for some small period of time until maturity B. The contract might be exercised before maturity A, but must be exercised until maturity B, so the contract will be settled, no matter what.
The first component (call option from the point of view of a buyer) is rather straight forward. I have priced that via binomial tree and Monte Carlo simulation and I’ve obtained almost the same results (positive value, difference 2 cents), but I’m thinking if I should somehow price the second feature and incorporate it in the final value (the one which will activate once the option buyer decides not to exercise the option before the maturity A)? To give you a better overview, I can tell you that under Monte Carlo simulation, the average option price from all values at particular dates are decreasing in time and at maturity A, in around 80% of cases the option value equals zero. Can I deal with such contract like in the case of an option contract (mainly in terms of pricing)? How to find fair value of that contract from the point of view of buyer and seller?
Any tips and feedback will be much appreciated.
Best,
Marek
Because this is OTC product, there are some non-trivial features here, naming the option buyer have the right to buy the underlying asset in a particular period of time, but if he won’t exercise it before the maturity (let’s call that maturity A), the option seller will then gain an option to sell it to the buyer for some small period of time until maturity B. The contract might be exercised before maturity A, but must be exercised until maturity B, so the contract will be settled, no matter what.
The first component (call option from the point of view of a buyer) is rather straight forward. I have priced that via binomial tree and Monte Carlo simulation and I’ve obtained almost the same results (positive value, difference 2 cents), but I’m thinking if I should somehow price the second feature and incorporate it in the final value (the one which will activate once the option buyer decides not to exercise the option before the maturity A)? To give you a better overview, I can tell you that under Monte Carlo simulation, the average option price from all values at particular dates are decreasing in time and at maturity A, in around 80% of cases the option value equals zero. Can I deal with such contract like in the case of an option contract (mainly in terms of pricing)? How to find fair value of that contract from the point of view of buyer and seller?
Any tips and feedback will be much appreciated.
Best,
Marek
