In this thesis we study the pricing of options of American type in a continuous time setting. We begin with a general introduction where we briefly sketch history and different aspects of the option pricing problem. In the first chapter we consider four perpetual options of American type driven by a geometric Brownian motion: the American put and call, the Russian option and the integral option. We derive their values exploiting properties of Brownian motion and Bessel processes. From a practical point of view perpetual options do not seem of much use, since in practice the time of expiration is always finite. However, following an appealing idea of Peter Carr, we build an approximating sequence of perpetual-type options and prove this co...
In this paper we derive analytic expressions for the value of European Put and Call options when th...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
L????vy processes are becoming increasingly important in Mathematical Finance. This thesis aims to c...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
The purpose of this thesis is to study the pricing of exotic options in exponential Lévy models. In ...
We study the perpetual American option characteristics in the case where the underlying dynamics inv...
We study perpetual American option pricing problems in an extension of the Black-Merton-Scholes mode...
We derive explicit solutions to the perpetual American cancellable standard put and call options in ...
We derive closed-form solutions to the perpetual American standard and floating-strike lookback put ...
In this article the problem of the American option valuation in a Lévy process setting is analysed....
This dissertation studies option pricing, portfolio selection, and risk management assuming exponent...
In this article the problem of the American option valuation in a Lévy process setting is analysed. ...
AbstractLewis and Mordecki have computed the Wiener–Hopf factorization of a Lévy process whose restr...
We study the barrier that gives the optimal time to exercise an American option written on a time-de...
Abstract: We study the perpetual American option characteristics in the case where the underlying dy...
In this paper we derive analytic expressions for the value of European Put and Call options when th...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
L????vy processes are becoming increasingly important in Mathematical Finance. This thesis aims to c...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
The purpose of this thesis is to study the pricing of exotic options in exponential Lévy models. In ...
We study the perpetual American option characteristics in the case where the underlying dynamics inv...
We study perpetual American option pricing problems in an extension of the Black-Merton-Scholes mode...
We derive explicit solutions to the perpetual American cancellable standard put and call options in ...
We derive closed-form solutions to the perpetual American standard and floating-strike lookback put ...
In this article the problem of the American option valuation in a Lévy process setting is analysed....
This dissertation studies option pricing, portfolio selection, and risk management assuming exponent...
In this article the problem of the American option valuation in a Lévy process setting is analysed. ...
AbstractLewis and Mordecki have computed the Wiener–Hopf factorization of a Lévy process whose restr...
We study the barrier that gives the optimal time to exercise an American option written on a time-de...
Abstract: We study the perpetual American option characteristics in the case where the underlying dy...
In this paper we derive analytic expressions for the value of European Put and Call options when th...
We present solutions to some discounted optimal stopping problems for the maximum process in a model...
L????vy processes are becoming increasingly important in Mathematical Finance. This thesis aims to c...