We describe a simple Importance Sampling strategy for Monte Carlo simulations based on a least-squares optimization procedure. With several numerical examples, we show that such Least-squares Importance Sampling (LSIS) provides efficiency gains comparable to the state-of-the-art techniques, for problems that can be formulated in terms of the determination of the optimal mean of a multivariate Gaussian distribution. In addition, LSIS can be naturally applied to more general Importance Sampling densities and is particularly effective when the ability to adjust higher moments of the sampling distribution, or to deal with non-Gaussian or multi-modal densities, is critical to achieve variance reductions.Monte Carlo methods, Derivatives pricing, ...
Thesis (Ph.D.)--Boston University PLEASE NOTE: Boston University Libraries did not receive an Autho...
In this paper we explain how the importance sampling technique can be generalized from simulating ex...
International audienceMonte Carlo methods rely on random sampling to compute and approximate expecta...
We describe a simple Importance Sampling strategy for Monte Carlo simulations based on a least squar...
We describe a simple Importance Sampling strategy for Monte Carlo simulations based on a least-squar...
We illustrate how importance sampling can be implemented in the Least-Squares Monte-Carlo approach (...
Copyright © 2013 Qiang Zhao et al. This is an open access article distributed under the Creative Com...
Present work deals with the portfolio selection problem using mean-risk models where analysed risk m...
Monte Carlo method has received significant consideration from the context of quantitative finance m...
In the present work we study the important sampling method. This method serves as a variance reducti...
This paper presents a new efficient way to reduce the variance of an estimator of popular payoffs an...
The complexity of integrands in modern scientific, industrial and financial problems increases rapid...
This dissertation consists of two papers related to Monte Carlo techniques: the first paper is on th...
Importance sampling is one of the classical variance reduction techniques for increasing the efficie...
Monte Carlo simulation techniques that use function approximations have been successfully applied to...
Thesis (Ph.D.)--Boston University PLEASE NOTE: Boston University Libraries did not receive an Autho...
In this paper we explain how the importance sampling technique can be generalized from simulating ex...
International audienceMonte Carlo methods rely on random sampling to compute and approximate expecta...
We describe a simple Importance Sampling strategy for Monte Carlo simulations based on a least squar...
We describe a simple Importance Sampling strategy for Monte Carlo simulations based on a least-squar...
We illustrate how importance sampling can be implemented in the Least-Squares Monte-Carlo approach (...
Copyright © 2013 Qiang Zhao et al. This is an open access article distributed under the Creative Com...
Present work deals with the portfolio selection problem using mean-risk models where analysed risk m...
Monte Carlo method has received significant consideration from the context of quantitative finance m...
In the present work we study the important sampling method. This method serves as a variance reducti...
This paper presents a new efficient way to reduce the variance of an estimator of popular payoffs an...
The complexity of integrands in modern scientific, industrial and financial problems increases rapid...
This dissertation consists of two papers related to Monte Carlo techniques: the first paper is on th...
Importance sampling is one of the classical variance reduction techniques for increasing the efficie...
Monte Carlo simulation techniques that use function approximations have been successfully applied to...
Thesis (Ph.D.)--Boston University PLEASE NOTE: Boston University Libraries did not receive an Autho...
In this paper we explain how the importance sampling technique can be generalized from simulating ex...
International audienceMonte Carlo methods rely on random sampling to compute and approximate expecta...