La surface bouillante de l'économie mathématique (et la mort de Monsieur Patate)

Bélisle, François

January 2007

Mémoire numérisé par la Direction des bibliothèques de l'Université de Montréal.

Philosophie de l'économie

Économie mathématique

Histoire économique

Théorie de l'équilibre général

Économétrie

Bachelier

Mandelbrot

An Introduction to Modern Pricing of Interest Rate Derivatives

Nohrouzian, Hossein

January 2015

This thesis studies interest rates (even negative), interest rate derivatives and term structure of interest rates. We review the different types of interest rates and go through the evaluation of a derivative using risk-neutral and forward-neutral methods. Moreover, the construction of interest rate models (term-structure models), pricing of bonds and interest rate derivatives, using both equilibrium and no-arbitrage approaches are discussed, compared and contrasted. Further, we look at the HJM framework and the LMM model to evaluate and simulate forward curves and find the forward rates as the discount factors. Finally, the new framework (after financial crisis in 2008), under the collateral agreement (CSA) has been taken into consideration.

Interest Rates

Negative Interest Rates

Market Model

Martingale

Security Market Model

Term Structure Model

Risk-Neutral Measure

Forward-Neutral Measure

LIBOR

HJM

Collateral

Swap

Tenor

Interest Rate Derivatives

CSA Agreement

Bachelier.

Foreign Exchange Option Valuation under Stochastic Volatility

Rafiou, AS

January 2009

>Magister Scientiae - MSc / The case of pricing options under constant volatility has been common practise for decades. Yet market data proves that the volatility is a stochastic phenomenon, this is evident in longer duration instruments in which the volatility of underlying asset is dynamic and unpredictable. The methods of valuing options under stochastic volatility that have been extensively published focus mainly on stock markets and on options written on a single reference asset. This work probes the effect of valuing European call option written on a basket of currencies, under constant volatility and under stochastic volatility models. We apply a family of the stochastic models to investigate the relative performance of option prices. For the valuation of option under constant volatility, we derive a closed form analytic solution which relaxes some of the assumptions in the Black-Scholes model. The problem of two-dimensional random diffusion of exchange rates and volatilities is treated with present value scheme, mean reversion and non-mean reversion stochastic volatility models. A multi-factor Gaussian distribution function is applied on lognormal asset dynamics sampled from a normal distribution which we generate by the Box-Muller method and make inter dependent by Cholesky factor matrix decomposition. Furthermore, a Monte Carlo simulation method is adopted to approximate a general form of numeric solution The historic data considered dates from 31 December 1997 to 30 June 2008. The basket contains ZAR as base currency, USD, GBP, EUR and JPY are foreign currencies.

Black-Seholes-Merton model

Bachelier model

Sprenkle model

Boness model

Samuelson model

Multi-assets option

Monte Carlo integration

C++ simulation

Wiener process

Brownian motion vector