The multilevel Monte Carlo (MLMC) method for continuous-time Markov chains, first introduced by Anderson and Higham (SIAM Multiscal Model. Simul. 10(1), 2012), is a highly efficient simulation technique that can be used to estimate various statistical quantities for stochastic reaction networks (SRNs), in particular for stochastic biological systems. Unfortunately, the robustness and performance of the multilevel method can be affected by the high kurtosis, a phenomenon observed at the deep levels of MLMC, which leads to inaccurate estimates of the sample variance. In this work, we address cases where the high-kurtosis phenomenon is due to \textit{catastrophic coupling (characteristic of pure jump processes where coupled consecutive paths a...
The multi-level approach developed by Giles (2008) can be used to estimate mean first exit times for...
Stochastic models of biochemical reaction networks are often more realistic descriptions of cellular...
Within this work, the efficiency of Markov Chain Monte Carlo methods on infinite dimensional spaces,...
We explore efficient estimation of statistical quantities, particularly rare event probabilities, fo...
We explore efficient estimation of statistical quantities, particularly rare event probabilities, fo...
We show how to extend a recently proposed multi-level Monte Carlo approach to the continuous time Ma...
International audienceIn this work, we propose a smart idea to couple importance sampling and Multil...
Stochastic models of biochemical reaction networks are often more realistic descriptions of cellular...
Tau-leaping is a popular discretization method for generating approximate paths of continuous time, ...
We analyze and compare the computational complexity of different simulation strategies for Monte Car...
Documento depositado en el repositorio arXiv.org. Versión: arXiv:1404.5218v1 [stat.ME]In this paper ...
This paper addresses the Monte Carlo approximation of posterior probability distributions. In partic...
We propose a novel Continuation Multi Level Monte Carlo (CMLMC) algorithm for weak approximation of ...
In this work, we consider the problem of estimating summary statistics to characterise biochemical r...
Models of stochastic processes are widely used in almost all fields of science. Theory validation, p...
The multi-level approach developed by Giles (2008) can be used to estimate mean first exit times for...
Stochastic models of biochemical reaction networks are often more realistic descriptions of cellular...
Within this work, the efficiency of Markov Chain Monte Carlo methods on infinite dimensional spaces,...
We explore efficient estimation of statistical quantities, particularly rare event probabilities, fo...
We explore efficient estimation of statistical quantities, particularly rare event probabilities, fo...
We show how to extend a recently proposed multi-level Monte Carlo approach to the continuous time Ma...
International audienceIn this work, we propose a smart idea to couple importance sampling and Multil...
Stochastic models of biochemical reaction networks are often more realistic descriptions of cellular...
Tau-leaping is a popular discretization method for generating approximate paths of continuous time, ...
We analyze and compare the computational complexity of different simulation strategies for Monte Car...
Documento depositado en el repositorio arXiv.org. Versión: arXiv:1404.5218v1 [stat.ME]In this paper ...
This paper addresses the Monte Carlo approximation of posterior probability distributions. In partic...
We propose a novel Continuation Multi Level Monte Carlo (CMLMC) algorithm for weak approximation of ...
In this work, we consider the problem of estimating summary statistics to characterise biochemical r...
Models of stochastic processes are widely used in almost all fields of science. Theory validation, p...
The multi-level approach developed by Giles (2008) can be used to estimate mean first exit times for...
Stochastic models of biochemical reaction networks are often more realistic descriptions of cellular...
Within this work, the efficiency of Markov Chain Monte Carlo methods on infinite dimensional spaces,...