Recent work of Dupire and Carr and Lee has highlighted the importance of understanding the Skorokhod embedding originally proposed by Root for the model-independent hedging of variance options. Root's work shows that there exists a barrier from which one may define a stopping time which solves the Skorokhod embedding problem. This construction has the remarkable property, proved by Rost, that it minimizes the variance of the stopping time among all solutions. In this work, we prove a characterization of Root's barrier in terms of the solution to a variational inequality, and we give an alternative proof of the optimality property which has an important consequence for the construction of subhedging strategies in the financial context.
Optimal variance stopping (O.V.S.) problems are a new class of optimal stopping problems that differ...
The Azéma–Yor solution (resp., the Perkins solution) of the Skorokhod embedding problem has the prop...
We study the problem of finding the minimal initial capital needed in order to hedge without risk a ...
Root's solution (Root [1969]) to the Skorokhod embedding problem can be described as the first hitti...
Recently, the problem of finding robust bounds on option\r\nprices which incorporate information fro...
We give a variational inequality sufficient condition for optimal stopping problems. This result is ...
The robust pricing and hedging approach in Mathematical Finance, pioneered by Hobson (1998), makes s...
In the Black-Scholes option pricing paradigm it is assumed that the market-mak- er designs a continu...
We provide a complete characterisation of the Root solution to the Skorokhod embedding problem (SEP)...
Optimal stopping and mathematical finance are intimately connected since the value of an American op...
AbstractMotivated by applications in option pricing theory (Peskir, 1997b), (Research Report No. 386...
The Azéma-Yor solution (respectively the Perkins solution) of the Skorokhod embedding problem has t...
The problem of option hedging in the presence of proportional transaction costs can be formulated as...
The aim of this thesis is to study multi-asset barrier options, where the volatilities of the stocks...
Root’s solution of the Skorokhod embedding problem, free boundary PDEs and model-independent bounds ...
Optimal variance stopping (O.V.S.) problems are a new class of optimal stopping problems that differ...
The Azéma–Yor solution (resp., the Perkins solution) of the Skorokhod embedding problem has the prop...
We study the problem of finding the minimal initial capital needed in order to hedge without risk a ...
Root's solution (Root [1969]) to the Skorokhod embedding problem can be described as the first hitti...
Recently, the problem of finding robust bounds on option\r\nprices which incorporate information fro...
We give a variational inequality sufficient condition for optimal stopping problems. This result is ...
The robust pricing and hedging approach in Mathematical Finance, pioneered by Hobson (1998), makes s...
In the Black-Scholes option pricing paradigm it is assumed that the market-mak- er designs a continu...
We provide a complete characterisation of the Root solution to the Skorokhod embedding problem (SEP)...
Optimal stopping and mathematical finance are intimately connected since the value of an American op...
AbstractMotivated by applications in option pricing theory (Peskir, 1997b), (Research Report No. 386...
The Azéma-Yor solution (respectively the Perkins solution) of the Skorokhod embedding problem has t...
The problem of option hedging in the presence of proportional transaction costs can be formulated as...
The aim of this thesis is to study multi-asset barrier options, where the volatilities of the stocks...
Root’s solution of the Skorokhod embedding problem, free boundary PDEs and model-independent bounds ...
Optimal variance stopping (O.V.S.) problems are a new class of optimal stopping problems that differ...
The Azéma–Yor solution (resp., the Perkins solution) of the Skorokhod embedding problem has the prop...
We study the problem of finding the minimal initial capital needed in order to hedge without risk a ...