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Financial Engineering - I

Code: MA271 | L-T-P-C: 3-0-0-6

Prerequistes: MA 225 or equivalent.

Overview of financial engineering, financial markets and financial instruments; Interest rates, present and future values of cash flow streams; Riskfree assets, bonds and bond pricing, yield, duration and convexity, term structure of interest rates, spot and forward rates; Risky assets, risk-reward analysis, Markowitz’s mean-variance portfolio optimization model and efficient frontier, CAPM; No-arbitrage principle; Derivative securities, forward and futures contracts and their pricing, hedging strategies using futures, interest rate and index futures, swaps; General properties of options, trading strategies involving options; Discrete time financial market model, Cox-Ross-Rubinstein binomial asset pricing model, pricing of European derivative securities by replication; Countable probability spaces, filtrations, conditional expectations and their properties, martingales, Markov processes; Risk-neutral pricing of European and American derivate securities.

Texts:

  1. M. Capinski and T. Zastawniak, Mathematics for Finance: An Introduction to Financial Engineering, 2nd Ed., Springer, 2010.
  2. S. Shreve, Stochastic Calculus for Finance, Vol. I, Springer, 2004.

References:

  1. J. C. Hull, Options, Futures and Other Derivatives, 10th Ed., Pearson, 2018.
  2. J. Cvitanic and F. Zapatero, Introduction to the Economics and Mathematics of Financial Markets, Prentice-Hall of India, 2007.
  3. S. Roman, Introduction to the Mathematics of Finance: From Risk Management to Options Pricing, Springer, 2004.
  4. D. G. Luenberger, Investment Science, 2nd Ed., Oxford University Press, 2013.
  5. N. J. Cutland and A. Roux, Derivative Pricing in Discrete Time, Springer, 2012