This thesis treats a range of stochastic methods with various applications, most notably in finance. It is comprised of five articles, and a summary of the key concepts and results these are built on. The first two papers consider a jump-to-default model, which is a model where some quantity, e.g. the price of a financial asset, is represented by a stochastic process which has continuous sample paths except for the possibility of a sudden drop to zero. In Paper I prices of European-type options in this model are studied together with the partial integro-differential equation that characterizes the price. In Paper II the price of a perpetual American put option in the same model is found in terms of explicit formulas. Both papers also study ...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
In this paper, we solve an optimal stopping problem with an infinite time horizon, when the state va...
This thesis treats a range of stochastic methods with various applications, most notably in finance....
Traditional methods of option pricing are based on models of pricing processes, which are various mo...
Research conducted in mathematical finance focuses on the quantitative modeling of financial markets...
This thesis deals with three problems in financial engineering and Monte Carlo simulation.We first p...
The seminal paper of Black and Scholes (1973) led to the explosive growth of option pricing and hedg...
In this thesis two novel approaches to pricing of barrier and American options are developed in the ...
Thesis (Ph.D.)--University of Washington, 2019We examine three problems in mathematical finance. The...
This dissertation is concerned with the classical problem of pricing an American option written on a...
This PhD dissertation consists of three independent parts and deals with applications of stochastic ...
In this paper we solve an optimal stopping problem with an infinite time horizon, when the state var...
Modern financial engineering is a part of applied mathematics that studies market models. Each model...
We extend the stochastic volatility model in Moretto et al. [MPT05] to a stochastic volatility jump-...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
In this paper, we solve an optimal stopping problem with an infinite time horizon, when the state va...
This thesis treats a range of stochastic methods with various applications, most notably in finance....
Traditional methods of option pricing are based on models of pricing processes, which are various mo...
Research conducted in mathematical finance focuses on the quantitative modeling of financial markets...
This thesis deals with three problems in financial engineering and Monte Carlo simulation.We first p...
The seminal paper of Black and Scholes (1973) led to the explosive growth of option pricing and hedg...
In this thesis two novel approaches to pricing of barrier and American options are developed in the ...
Thesis (Ph.D.)--University of Washington, 2019We examine three problems in mathematical finance. The...
This dissertation is concerned with the classical problem of pricing an American option written on a...
This PhD dissertation consists of three independent parts and deals with applications of stochastic ...
In this paper we solve an optimal stopping problem with an infinite time horizon, when the state var...
Modern financial engineering is a part of applied mathematics that studies market models. Each model...
We extend the stochastic volatility model in Moretto et al. [MPT05] to a stochastic volatility jump-...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
In this paper, we solve an optimal stopping problem with an infinite time horizon, when the state va...