Pre-requisite: MA 225 Probability Theory and Random Processes
Financial markets; Cash flow, time value of money, net present value,
net future value; Fixed income securities: Bonds and bonds pricing,
yield curves, duration and convexity.
Term structure of interest rates, spot and forward rates;
Equities, risk-reward analysis, asset pricing models, mean variance
portfolio optimization, Markowitz model and efficient frontier,
CAPM and APT; Discrete time market models: Assumptions, portfolios
and trading strategies, replicating portfolios, risk neutral
probability measures, valuation of contingent claims, fundamental
theorem of asset pricing; The Cox-Ross-Rubinstein (CRR) model,
pricing in CRR model, Black-Scholes formula derived as a limit of
the CRR pricing formula;
Derivative securities: futures and forward contracts, hedging
strategies using futures, pricing of futures and forward contracts,
interest rate futures;
Properties of options, contingent claims, trading strategies and
binomial trees, pricing of stock options, options on stock indices,
currencies and futures, European and American options;
Greeks, delta hedging and risk management, volatility smiles;
Interest rate derivatives (basic term structure model, swaps and
swaptions, caps and floors).
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