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Hi Guys, Just wondering if you could suggest applications of distribution of the supremum of a fractional Brownian motion process with a drift ? Also if you could possibly recommend how to approach this problem, that would be much appreciated. Cheers |
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An application that springs to mind immediately is option evaluation. Suppose I offer you to buy a contract to me: after three months I pay you the maximum value of the price of an asset. How much are you willing to pay this contract ? If you model the price of the assert by a drifted brownian motion, then you'll probably want to estimate the distribution of this maximum and take the expected value as a first guess of this maximum price. This will also be my first guess at the minimum price at which I will be willing to sell the contract. This is a non arbitrage price. Note to purists : of course one will object that each of the parties can hedge himself, and that the distribution has to be corrected by a risk neutral argument (which will probably discard the initial drift and replace it by a zero risk rate drift instead). N.b. : this is a real world application, exotic option traders buy and sell like contracts everyday. |
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