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WSC
2007
2007
Rare-event simulation for a multidimensional random walk with t distributed increments
We consider the problem of efficient estimation of first passage time probabilities for a multidimensional random walk with t distributed increments, via simulation. In addition of being a natural generalization of the problem of computing ruin probabilities in insurance – in which the focus is a one dimensional random walk – this problem captures important features of large deviations for multidimensional heavy-tailed processes (such as the role played by the mean of the random walk in connection to the spatial location of the target set). We develop a state-dependent importance sampling estimator for this class of multidimensional problems. Then, we argue – using techniques based on Lyapunov type inequalities – that our estimator is strongly efficient.
Real-time TrafficModeling And Simulation | Multidimensional Heavy-tailed Processes | Multidimensional Random Walk | Random Walk | WSC 2007 |
| Added | 02 Oct 2010 |
| Updated | 02 Oct 2010 |
| Type | Conference |
| Year | 2007 |
| Where | WSC |
| Authors | Jose H. Blanchet, Jingchen Liu |
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