We develop a flexible discrete-time hedging methodology that minimizes the expected value of any desired penalty function of the hedging error within a general regime-switching framework. A numerical algorithm based on backward recursion allows for the sequential construction of an optimal hedging strategy. Numerical experiments comparing this and other methodologies show a relative expected penalty reduction ranging between 0.9% and 12.6% with respect to the best benchmark
We analyze hedging strategies that minimize tail risk measured by Value-at-Risk (VaR) or Conditional...
We consider the hedging error of a derivative due to discrete trading in the presence of a drift in ...
In this paper we consider the mean-variance hedging problem of a continuous state space financial mo...
Cette prépublication apparaît aussi sur SSRN et les cahiers du GERAD.International audienceBuilding ...
We present a closed form solution for the optimal hedging strategy, in discrete time, of an option w...
We propose a new methodology for discrete time dynamic hedging with transaction costs that has three...
In this paper the general discrete time mean-variance hedging problem is solved by dynamic programmi...
We discuss an optimal asset allocation problem in a wide class of discrete-time regime-switching mod...
In this paper, we analyze futures-based hedging strategies which minimize tail risk measured by Val...
The relationship between futures and spot prices for the China's commodity futures markets disp...
We examine the behavior of optimal mean–variance hedging strategies at high re-balancing frequencies...
We study hedging and pricing of claims in a non-markovian regime-switching financial model. Our fina...
AbstractThis work develops numerical approximation methods for quantile hedging involving mortality ...
[[abstract]]Most of the existing Markov regime switching GARCH-hedging models assume a common switch...
This paper proposes a Markov regime switching framework for modeling carbon emission (CO2) allowance...
We analyze hedging strategies that minimize tail risk measured by Value-at-Risk (VaR) or Conditional...
We consider the hedging error of a derivative due to discrete trading in the presence of a drift in ...
In this paper we consider the mean-variance hedging problem of a continuous state space financial mo...
Cette prépublication apparaît aussi sur SSRN et les cahiers du GERAD.International audienceBuilding ...
We present a closed form solution for the optimal hedging strategy, in discrete time, of an option w...
We propose a new methodology for discrete time dynamic hedging with transaction costs that has three...
In this paper the general discrete time mean-variance hedging problem is solved by dynamic programmi...
We discuss an optimal asset allocation problem in a wide class of discrete-time regime-switching mod...
In this paper, we analyze futures-based hedging strategies which minimize tail risk measured by Val...
The relationship between futures and spot prices for the China's commodity futures markets disp...
We examine the behavior of optimal mean–variance hedging strategies at high re-balancing frequencies...
We study hedging and pricing of claims in a non-markovian regime-switching financial model. Our fina...
AbstractThis work develops numerical approximation methods for quantile hedging involving mortality ...
[[abstract]]Most of the existing Markov regime switching GARCH-hedging models assume a common switch...
This paper proposes a Markov regime switching framework for modeling carbon emission (CO2) allowance...
We analyze hedging strategies that minimize tail risk measured by Value-at-Risk (VaR) or Conditional...
We consider the hedging error of a derivative due to discrete trading in the presence of a drift in ...
In this paper we consider the mean-variance hedging problem of a continuous state space financial mo...