B.Tech Mathematics

MA 373                                    Financial Engineering - II             3-0-0-6

Syllabus: Continuous time financial market models, Black-Scholes-Merton model, Black-Scholes-Merton equation and formula, dividend paying assets, forwards and futures, risk-neutral valuation of European, American and Exotic derivative securities, change of numeraire, hedging of contingent claims, Greeks, implied volatility, volatility smile; Options on futures; Incomplete markets, stochastic volatility models, pricing and hedging in incomplete markets; Fixed income markets, bonds and interest rates, pricing of fixed income securities, term structure equation; Short rate models, martingale models for short rate (Vasicek, Cox-Ingersoll-Ross, Dothan, Ho-Lee and Hull-White models), multifactor models; Forward rate models, Heath-Jarrow-Morton framework, pricing and hedging under short rate and forward rate models, swaps, caps and floors; LIBOR and swap market models.

Texts:

1. Bjork, Arbitrage Theory in Continuous Time, 3^rd Edition, Oxford University Press, 2003.
2. Shreve, Stochastic Calculus for Finance, Volume II, Springer, 2004.

References:

1. C. Hull, Options, Futures and Other Derivatives, 10^th Edition, Pearson, 2018.
2. Brigo and F. Mercurio, Interest Rate Models: Theory and Practice, Springer, 2006.
3. H. Bingham and R. Kiesel, Risk-Neutral Valuation, 2^nd Edition, Springer, 2004.
4. Cvitanic and F. Zapatero, Introduction to the Economics and Mathematics of Financial Markets, Prentice-Hall of India, 2007.
5. Musiela and M. Rutkwoski, Martingale Method in Financial Modelling, 2^nd Edition, Springer, 2005.