1. Black-Scholes PDE:
Show that the Black-Scholes price for a European Put with strike K and expiration T
P(t; St) = Ke-r(T- t)Φ(-d2(T - t, St)) - StΦ(-d1(T - t, St)),
where
d1(T - t, St) = (log{St/K} + (r + 1/2·σ2)(T - t)/σ√(T- t))
and
d2(T - t, St) = d1(T - t, St) - σ√(T- t)
and Φ(·) is the cumulative distribution function of the standard normal distribution function, satisfies the Black-Scholes PDE with the terminal condition for the European Put. What is the Delta?
2. More Black-Scholes Formulas:
Assume the Black-Scholes model with interest rate r > 0 and volatility σ > 0. Calculate the Black-Scholes price at time 0 of the following binary options:
(a) Cash-or-nothing call with payoff - CC(S) = C · 1{S≥K}, C > 0.
(b) Cash-or-nothing put with payoff - CP(S) = C · 1{S, C > 0.
(c) Asset-or-nothing call with payoff - AC(S) = S · 1{S≥K}.
(d) Asset-or-nothing put with payoff - AP(S) = S · 1{S.
3. Delta-Hedging:
Assume today is 01/31/2007. The S&P 500 index is at $1,428.65, its volatility is 17.17%, and the risk-free interest rate is 5%. You work in an investment bank that sells a European Put option at the money (i.e. the strike is K = $1; 428.65) expiring in one year (at t = T = 1). For simplicity, assume that the year has 256 (=28) (trading-) days.
In the attached ?le "HW5Series.xls" you find the actual evolution of the S&P 500 over the next year, i.e. over the next 256 days, as well as 3 fictional evolutions (simulated paths). You are in charge of hedging the option, i.e. you have to trade stock and money market account to hedge your bank's position. Proceed as follows:
(a) Determine the option price at time zero by the Black-Scholes formula. That's what your customers pay.
(b) Using the option premium which your bank obtains, set up a hedging portfolio for each of the 4 given paths and rebalance your position every 16/4/1 days, respectively.
(c) At time T = 1, report your profit or loss (p&l) for each of the 12 = 4 x 3 cases (4 different paths x three different rebalancing periods).
(d) Interpret your results.
Don't send me Excel Files! Please write up a report (max. 1 page) with your pro?ts/losses and your interpretation.