AbstractWe study the problem of optimally hedging exotic derivatives positions using a combination of dynamic trading strategies in underlying stocks and static positions in vanilla options when the performance is quantified by a convex risk measure. We establish conditions for the existence of an optimal static position for general convex risk measures, and then analyze in detail the case of shortfall risk with a power loss function. Here we find conditions for uniqueness of the static hedge. We illustrate the computational challenge of computing the market-adjusted risk measure in a simple diffusion model for an option on a non-traded asset
Traditional dynamic hedging strategies are based on local information (ie Delta and Gamma) of the fi...
This paper utilizes the static hedge portfolio (SHP) approach of Derman et al. [Derman, E., Ergener,...
In incomplete financial markets not every contingent claim can be replicated by a self-financing str...
AbstractWe study the problem of optimally hedging exotic derivatives positions using a combination o...
We explore how to put the theory on static hedges of barrier options into use. We discuss a polynomi...
In this chapter we give a survey of results for semi-static hedging strategies for exotic options un...
We propose an approximate static hedging procedure for multivariate derivatives. The hedging portfol...
AbstractThis paper presents a new methodology for hedging long-term financial derivatives written on...
We consider the hedging of derivative securities when the price movement of the underlying asset can...
Despite much work on hedging in incomplete markets, the literature still lacks tractable dynamic hed...
This paper applies to the static hedge of barrier options a technique meansquare hedging designed t...
We develop a generic method for constructing a weak static minimum variance hedge for a wide range o...
Working in a single-factor Markovian setting, this paper derives a new, static spanning rela-tion be...
We investigate how sensitive dierent dynamic and static hedge strategies for barrier options are to ...
Traditional dynamic hedging strategies are based on local information (ie Delta and Gamma) of the f...
Traditional dynamic hedging strategies are based on local information (ie Delta and Gamma) of the fi...
This paper utilizes the static hedge portfolio (SHP) approach of Derman et al. [Derman, E., Ergener,...
In incomplete financial markets not every contingent claim can be replicated by a self-financing str...
AbstractWe study the problem of optimally hedging exotic derivatives positions using a combination o...
We explore how to put the theory on static hedges of barrier options into use. We discuss a polynomi...
In this chapter we give a survey of results for semi-static hedging strategies for exotic options un...
We propose an approximate static hedging procedure for multivariate derivatives. The hedging portfol...
AbstractThis paper presents a new methodology for hedging long-term financial derivatives written on...
We consider the hedging of derivative securities when the price movement of the underlying asset can...
Despite much work on hedging in incomplete markets, the literature still lacks tractable dynamic hed...
This paper applies to the static hedge of barrier options a technique meansquare hedging designed t...
We develop a generic method for constructing a weak static minimum variance hedge for a wide range o...
Working in a single-factor Markovian setting, this paper derives a new, static spanning rela-tion be...
We investigate how sensitive dierent dynamic and static hedge strategies for barrier options are to ...
Traditional dynamic hedging strategies are based on local information (ie Delta and Gamma) of the f...
Traditional dynamic hedging strategies are based on local information (ie Delta and Gamma) of the fi...
This paper utilizes the static hedge portfolio (SHP) approach of Derman et al. [Derman, E., Ergener,...
In incomplete financial markets not every contingent claim can be replicated by a self-financing str...