Rare event simulation in finite-infinite dimensional space
Au, Siu-Kui and Patelli, Edoardo (2016) Rare event simulation in finite-infinite dimensional space. Reliability Engineering and System Safety, 148. pp. 66-77. ISSN 0951-8320 (https://doi.org/10.1016/j.ress.2015.11.012)
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Abstract
Modern engineering systems are becoming increasingly complex. Assessing their risk by simulation is intimately related to the efficient generation of rare failure events. Subset Simulation is an advanced Monte Carlo method for risk assessment and it has been applied in different disciplines. Pivotal to its success is the efficient generation of conditional failure samples, which is generally non-trivial. Conventionally an independent-component Markov Chain Monte Carlo (MCMC) algorithm is used, which is applicable to high dimensional problems (i.e., a large number of random variables) without suffering from ‘curse of dimension’. Experience suggests that the algorithm may perform even better for high dimensional problems. Motivated by this, for any given problem we construct an equivalent problem where each random variable is represented by an arbitrary (hence possibly infinite) number of ‘hidden’ variables. We study analytically the limiting behavior of the algorithm as the number of hidden variables increases indefinitely. This leads to a new algorithm that is more generic and offers greater flexibility and control. It coincides with an algorithm recently suggested by independent researchers, where a joint Gaussian distribution is imposed between the current sample and the candidate. The present work provides theoretical reasoning and insights into the algorithm.
ORCID iDs
Au, Siu-Kui and Patelli, Edoardo ORCID: https://orcid.org/0000-0002-5007-7247;-
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Item type: Article ID code: 70473 Dates: DateEvent30 April 2016Published27 November 2015Published Online7 November 2015AcceptedSubjects: Science > Mathematics
Technology > Engineering (General). Civil engineering (General)Department: Faculty of Engineering > Civil and Environmental Engineering Depositing user: Pure Administrator Date deposited: 08 Nov 2019 08:56 Last modified: 18 Dec 2024 05:43 URI: https://strathprints.strath.ac.uk/id/eprint/70473